mradermacher/Qwen3VL_Euclid_30B-i1-GGUF
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$如图,已知平行六面体ABCD-A_{1}B_{1}C_{1}D_{1}中,底面ABCD是边长为1的正方形,AA_{1}=2,\angle A_{1}AB=\angle A_{1}AD=120^\circ .$<image>
$(2)求异面直线AC_{1}与A_{1}D所成角的余弦值;$
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$\frac{\frac{1}{2}+\frac{13}{2}}{\sqrt{5}\cdot \sqrt{5}}=\frac{7}{10}$
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<image>As shown in the figure, in rhombus $ABCD$, diagonals $AC$ and $BD$ intersect at point $O$, and $OE \perp AB$ with the foot of the perpendicular at $E$. If $\angle ADC = 128{}^\circ$, then the measure of $\angle AOE$ is.
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64°
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<image>Find x.
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$4 \sqrt { 3 }$
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<image>As shown in the figure, the graph of the function y = ax - 1 passes through the point (1, 2). The solution set for the inequality ax - 1 > 2 with respect to x is ______.
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x > 1
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<image>As shown in the figure, given AB = A$_{1}$B, points A$_{2}$, A$_{3}$, A$_{4}$, …, A$_{n}$ are sequentially taken on the extension of AA$_{1}$. Isosceles triangles are constructed outside the triangle such that A$_{1}$C$_{1}$ = A$_{1}$A$_{2}$, A$_{2}$C$_{2}$ = A$_{2}$A$_{3}$, A$_{3}$C$_{3}$ = A$_{3}$A$_{4}$, …, A$_{n-1}$C$_{n-1}$ = A$_{n-1}$A$_{n}$. Let ∠BA$_{1}$A = ∠1, ∠C$_{1}$A$_{2}$A$_{1}$ = ∠2, and so on. If ∠B = 30°, then ∠n = °.
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$\frac{75}{{{2}^{n-1}}}$
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<image>Find x
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$6 \sqrt { 2 }$
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<image>What is the angle between line $l$ and plane $m$?
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$15^\circ$
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<image>The figure below shows an irregular geometric shape. To find its area, a square with a side length of $1m$ is drawn within the shape. A stone is randomly thrown into the shape, and the following records are made: Number of throws: $150$ times, $570$ times, $860$ times. Number of times the stone lands inside the square (including on the edges): $38$, $142$, $214$. Number of times the stone lands within the shaded area: $112$, $428$, $646$. Estimate the area of the irregular geometric shape in ${{m}^{2}}$ (round to the nearest integer).
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$4$
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<image>The figure shows a partial structure diagram used by a mall when formulating a sales plan. The number of main elements affecting the 'plan' is ___.
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$$3$$
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<image>As shown in the figure, the slope of a certain hillside $$AB=200$$ meters, and the angle of inclination $$\angle BAC=30{{}^\circ}$$, then the height of the hillside $$BC$$ is ______ meters.
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$$100$$
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<image>As shown in the figure, a plane perpendicular to the base cuts the regular triangular prism to form a cross-section MNGH. M and N are the midpoints of the respective line segments. What is the area of the quadrilateral MNGH?
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$12\sqrt{3}$
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<image>As shown in the figure, the ladder $$AB$$ is $$\quantity{5}{m}$$ long, with its top $$A$$ leaning against the wall $$AC$$. At this time, the distance between the bottom of the ladder $$B$$ and the corner of the wall $$C$$ is $$\quantity{3}{m}$$. After the ladder slides and stops at the position $$DE$$, the length of $$DB$$ is measured to be $$\quantity{1}{m}$$, then the top of the ladder $$A$$ has slid down ___ $$\unit{m}$$.
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$$1$$
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<image>As shown in the figure, the output result of the program flowchart is ___.
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$$55$$
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<image>As shown in the figure, the side length of the square is 4 cm. After cutting off the four corners, it becomes a regular octagon. The area of this regular octagon is
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$\left( 32\sqrt{2}-32 \right)\text{c}{{\text{m}}^{2}}$
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<image>Find x. Round to the nearest tenth.
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$17.7$
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<image>If $J,P,$ and $L$ are the midpoints of $\overline{KH}, \overline{HM}$ and $\overline{MK}$, respectively. Find $x$.
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$4.75$
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<image> As shown in the figure, it is a geometric solid built by 8 identical small cubes. Its three views are all 2×2 squares. If several small cubes are removed (the geometric solid does not collapse) and its three views are still 2×2 squares, then the maximum number of small cubes that can be removed is ( ).
A. 1
B. 2
C. 3
D. 4
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B
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<image>In Happiness Village, the area planted with fruit trees is shown in the figure. The area planted with pear trees is ___ of the total fruit tree area.
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$$\dfrac{1}{4}$$
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<image>The execution result of the following pseudocode is ___.
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$$65$$
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A geometric body composed of several small cubes with equal side lengths is viewed from three different directions as shown in the figures. The number of small cubes that make up this geometric body is $\qquad$
<image>
Viewed from the front
<image>
Viewed from the left
<image>
Viewed from above
##
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5
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<image>As shown in the figure, quadrilateral DXMP is a square, EP⊥plane DXMP, CX//EP. Given DX=47.4, EP=47.4, CX=23.7, where 47.4=47.4. Let the volumes of triangular pyramids E-DMP, C-DXM, C-DME be volume_1, volume_2, volume_3 respectively. Find the ratio of volume_3 to volume_1.
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1.5
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$如图,在三棱柱ABC-A_{1}B_{1}C_{1}中,AA_{1}\perp 平面ABC,AC=BC=AA_{1}=1,AC\perp BC,且D,E,F分别为棱AB,BC,AC的中点.$<image>
$(2)在棱CC_{1}上是否存在点M,使得DM\perp 平面A_{1}B_{1}EF?若存在,求出\frac{CM}{CC_1}的值;若不存在,请说明理由.$
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$\frac{1}{4}$
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<image>As shown in the figure, 2 of segments are cylinders on each side of the solid with radius of 11. Calculate the volume of the solid. Round your answer to one decimal place.
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1608.5
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<image>Find the area of the figure. Round to the nearest tenth.
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$28.3$
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<image>In the figure, in $$\triangle ABC$$, the angle bisectors of $$\angle ABC$$ and $$\angle ACB$$ intersect at point $$P$$. If $$\angle A=30^{\circ}$$, then $$\angle P=$$ ___.
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$$105$$
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<image>As shown in the figure, in the Cartesian coordinate system, the coordinates of point A are.
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(-2, 3)
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<image>If $\angle R S T$ is a right angle, $\overline{SU} \perp \overline{RT}$, $\overline{UV} \perp \overline{ST},$ and $m \angle RT S=47,$ find $m \angle RSU$
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$47$
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The figure shows the planar development of a cube. If the development is folded back into a cube such that the numbers on opposite faces are additive inverses of each other, then the value of $a - b - c$ is $\qquad$.
<image>
##
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-2
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<image>As shown in the figure, what is the length of diagonal $EC$ in the rectangular prism?
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$3\sqrt{7}$
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<image>As shown in the figure, $$\triangle ABC$$ is an equilateral triangle. If point $$A$$ is rotated 30° clockwise around point $$C$$ to point $$A'$$, and $$A'B$$ is connected, then the measure of $$\angle ABA'$$ is ___.
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$$15^{\circ}$$
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<image>As shown in the figure, the diameter $$AB = 12$$ of circle $$ \odot O$$, $$CD$$ is a chord of $$ \odot O$$, $$CD \bot AB$$, and the foot of the perpendicular is $$P$$. Given that $$BP:AP = 1:5$$, the length of $$CD$$ is ( ).
A. $$4\sqrt{2}$$
B. $$8\sqrt{2}$$
C. $$2\sqrt{5}$$
D. $$4\sqrt{5}$$
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D
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<image>As shown in the figure, which triangle is congruent to $\triangle ABD$? A. $\triangle CDB$; B. $\triangle AOB$; C. $\triangle COD$; D. $\triangle BOD$
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A
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<image>The daily maximum temperatures for a week in my city are recorded in the following table: What is the average of the daily maximum temperatures for this week in $$\unit{\degreeCelsius } $$?
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$$27$$
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<image>As shown, in quadrilateral prism BCYL-FJIG, the base BCYL is a trapezoid satisfying: (1) BC∥YL; (2) BL⊥BC; (3) BC=191.2>0, BL=LY=95.6>0; (4) lateral edge BF=191.2>0 and BF⊥base BCYL; (5) Z is the midpoint of JI, V is the midpoint of LG. Find the distance from point C to plane YJV.
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57.648969083268405
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<image>As shown in the figure, are triangles $\triangle ABC$ and $\triangle GFE$ centrally symmetric? (Write "Yes" or "No")
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Yes
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<image>All six sides of a rectangular solid were rectangles. A one-foot cube was cut out of the rectangular solid as shown. The total number of square feet in the surface of the new solid is how many more or less than that of the original solid?
<image1> A. $2\text{ less}$
B. $1\text{ less}$
C. $\text{the same}$
D. $1\text{ more}$
E. $2\text{ more}$
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C
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<image>In the cube $$ABCD-A_{1}B_{1}C_{1}D$$, the angle formed by the skew lines $$A_{1}B$$ and $$B_{1}C$$ is ___.
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$$60^{ \circ }$$
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<image>Given that the side length of rhombus $$ABCD$$ is $$2$$, and $$\angle BAD=120^{ \circ }$$, points $$E$$ and $$F$$ are on $$BC$$ and $$DC$$ respectively, such that $$\overrightarrow{BE}= \lambda \overrightarrow{BC}$$ and $$\overrightarrow{CF}= \lambda \overrightarrow{CD}$$. If $$\overrightarrow{AE}\cdot \overrightarrow{BF}=-1$$, then $$\lambda =$$___.
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$$\dfrac{\sqrt{2}}{2}$$
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<image>Plane $\\alpha$ intersects a cylinder, and plane $\\alpha$ is not perpendicular to the axis of the cylinder. Point Y is any point on the intersection line between plane $\\alpha$ and the cylinder surface, two spheres with radii equal to the base radius of the cylinder are placed inside the cylinder. Plane $\\alpha$ is tangent to the two spheres at points N and B respectively. A generatrix of the cylinder passing through point Y is tangent to the two spheres at points I and Q respectively. Let the length of segment $NB$ be $169.0$ and the length of segment $IQ$ be $169.0$, where $169.0 > 169.0$. In plane $\\alpha$, the intersection point of any two mutually perpendicular tangent lines of $\\Gamma$ is P. Establish an appropriate coordinate system and find the trajectory equation of moving point P: x^2 + y^2 = ______.
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7140.25
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<image>A unit cube has vertices $P_1, P_2, P_3, P_4, P_1', P_2', P_3'$, and $P_4'$. Vertices $P_2, P_3$, and $P_4$ are adjacent to $P_1$, and for $1\leq i\leq 4$, vertices $P_i$ and $P_i'$ are opposite to each other. A regular octahedron has one vertex in each of the segments $P_1P_2, P_1P_3, P_1P_4, P_1'P_2', P_1'P_3'$, and $P_1'P_4'$. What is the octahedron's side length?
<image1> A. $\frac{3\sqrt{2}}{4}$
B. $\frac{7\sqrt{6}}{16}$
C. $\frac{\sqrt{5}}{2}$
D. $\frac{2\sqrt{3}}{3}$
E. $\frac{\sqrt{6}}{2}$
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A
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<image>Given that $a$, $b$, and $c$ are positioned on the number line as shown in the figure, then $\left| 2a-b \right|+5(c-a)-4\left| b-c \right|=$.
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-7a+5b+c
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<image>As shown in the figure, $$\angle B=\angle D=90\degree$$, $$BC=DC$$, $$\angle 1=40\degree$$, then $$\angle 2=$$______ degrees.
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$$50$$
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<image>Use the bisection method to find a zero of the function $$f\left (x \right )$$. The reference data is as follows: According to this data, an approximate value of a zero of $$f\left (x \right )$$ (accurate to $$0.01$$) is ___.
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$$1.56$$
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<image>In a senior high school, Class A and Class B of the third grade each selected 7 students to participate in a high school mathematics competition. The stem-and-leaf plot of their scores is shown below, where the median score of Class A is 81, and the average score of Class B is 86. What is the value of $x+y$?
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5
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<image>As shown in the figure, the vertex $$O$$ of $$\triangle AOB$$ is at the origin, point $$A$$ is in the first quadrant, and point $$B$$ is on the positive half of the $$x$$-axis, with $$AB=6$$ and $$\angle AOB=60^{\circ}$$. The graph of the inverse proportion function $$y=\dfrac{k}{x}$$ passes through point $$A$$. When $$\triangle AOB$$ is rotated $$120^{\circ}$$ clockwise around point $$O$$, vertex $$B$$ lands exactly on the graph of the function $$y=\dfrac{k}{x}$$. The value of $$k$$ is ___.
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$$9\sqrt{3}$$
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<image>The figure below shows the flowchart of an algorithm. If the input value of $$x$$ is $$2$$, then the output value of $$y$$ is ______.
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$$7$$
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<image>As shown in the figure, $$AB$$ and $$CD$$ are two diameters of circle $$⊙O$$, and $$E$$ is a point on circle $$⊙O$$. If $$BE=BC$$ and $$\angle BOE=40^{\circ}$$, then $$\angle AOC=$$ _____.
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$$140^{\circ}$$
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<image>What is the length of the slant height of the frustum shown in the figure?
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13
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<image> In quadrilateral EMUB let EM ⟂ EB with EM = MU = 260.0 (>0) and EB = 281.46 (>0) while MU ∥ EB.
- Choose C on EB so that RC = BC = 168.87 (>0) and RC ⟂ EB.
- Fold △ECD about CD to △RCD making RU = k·UB with k = 2.309401076758503 (>2); here UB = 260.0.
> (2) Let θ be the acute dihedral angle between planes RUB and RMD. Find \(\sinθ\).
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0.9922778767136675
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<image>As shown in the figure, in the cube $ABCD-{{A}_{1}}{{B}_{1}}{{C}_{1}}{{D}_{1}}$, $M$ and $N$ are the midpoints of $CD$ and $C{{C}_{1}}$ respectively. The angle formed by the skew lines ${{A}_{1}}M$ and $DN$ is.
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$\frac{\pi }{2}$
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<image>Find $m \angle 5$.
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$85$
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<image>If the program flowchart is as shown in the figure below, what is the value of $$i$$ output by the program?
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$$8$$
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<image>Run the pseudocode as shown in the figure, the output result S is.
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13
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<image>Execute the given pseudocode, the output result is ___.
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$$5$$
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<image>After the following program runs, the output result is _____.
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22,-22
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<image>Find the volume of the original solid.
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$80-\frac{4\pi}{3}$
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<image>As shown in the figure, it is a numerical operation program. When the input value of $$n$$ is $$2$$, the output result is ______.
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$$66$$
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<image>As shown in the figure, the straight line $$l_1$$: $$y=k_1x+4$$ intersects with the straight line $$l_2$$: $$y=k_2x-5$$ at point $$A$$. They intersect the $$y$$-axis at points $$B$$ and $$C$$, respectively. Points $$E$$ and $$F$$ are the midpoints of line segments $$AB$$ and $$AC$$, respectively. The length of line segment $$EF$$ is ______.
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$$4.5$$
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<image>In the figure, in $\Delta ABC$, the angle bisectors of $\angle B$ and $\angle C$ intersect at point $O$. A line $MN$ is drawn through point $O$ parallel to $BC$, intersecting $AB$ and $AC$ at points $M$ and $N$ respectively. If $AB=8$ and $AC=10$, then the perimeter of $\Delta AMN$ is.
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18
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<image>In the figure, in $$\triangle ABC$$, $$\angle A=60^{\circ}$$, and the angle bisectors $$BD$$ and $$CD$$ of $$\angle ABC$$ and $$\angle ACB$$ intersect at point $$D$$. Find $$\angle BDC= $$___.
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$$20^{\circ}$$
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<image>In the figure, in $$\triangle ABC$$, $$D$$ is a point on $$AB$$, and $$\angle ACD = \angle B$$. If $$AD = 2$$ and $$BD = \frac{5}{2}$$, then $$AC =$$ ___.
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$$3$$
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<image>Two point charges are placed at points B and C, respectively, forming an electric field with the electric field lines distributed as shown by the solid lines in the figure. There are also points A and D on the line connecting the two point charges, and AB = BC = CD. Which of the following statements is correct? ( )
A. The two point charges are of opposite types.
B. The electric force on a charge at point A could be zero.
C. The potential at point D is equal to that at point A.
D. Moving a charge along the perpendicular bisector of BC, the electric force does no work.
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A
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$如图,四面体ABCD中,\triangle ABC是正三角形,\triangle ACD是直角三角形,\angle ABD=\angle CBD,AB=BD.$
<image>
$过AC的平面交BD于点E,若平面AEC把四面体ABCD分成体积相等的两部分,求二面角D-AE-C的余弦值.$
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$\frac{\sqrt{7}}{7}$
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<image>Two triangles as shown in the figure cannot be combined to form ( ).
A. Square
B. Parallelogram
C. Rectangle
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A
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<image>The flowchart of the metrological certification review process of the Quality and Technology Supervision Bureau of a city is shown in the figure. From the figure, it can be seen that there are ___ stages in the review process where the application may not pass the review.
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$$3$$
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<image>As shown in the figure, there are two rectangular and one square enclosures. After Xiao Ming repairs the enclosure, what is the total length of the enclosure?
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$28\sqrt{2}$
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<image>As shown in the figure, a part of a regular $$n$$-sided polygon paper has been torn off. It is known that its central angle is $$40^{\circ}$$, then $$n=$$ ___.
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$$9$$
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<image>As shown in the figure, $$AB$$ is the diameter of the semicircle $$O$$, $$C$$ and $$D$$ are the trisection points of the semicircle. If the radius of $$\odot O$$ is $$1$$, and $$E$$ is any point on the line segment $$AB$$, then the area of the shaded region is ___.
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$$\dfrac{\pi }{6}$$
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<image>As shown in the figure, the diagonals $$AC$$ and $$BD$$ of rhombus $$ABCD$$ intersect at point $$O$$, and $$E$$ is the midpoint of $$AD$$. If $$OE=3$$, then the perimeter of rhombus $$ABCD$$ is ___.
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$$24$$
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<image>As shown in the figure, what is the area of rhombus $ABCD$? (Answer with a decimal)
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30.45
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<image>As shown in the figure, Xiaoming observes a solid from three different angles and obtains the following results. $M$ is the midpoint of the hypotenuse, and $\tan\alpha = \frac{1}{2}$. What is the volume of this solid?
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$\frac{10\pi}{3}$
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<image>As shown, given a parallelepiped MEGW-BCYH satisfying: (1) the base MEGW is a rhombus with ME=MW=45.4>0 and ∠EMW=2.0943951023931953 (0<2.0943951023931953<π); (2) the lateral edge MB is perpendicular to the base MEGW with MB=39.32>0. Find the sine of dihedral angle E-BW-M (with edge BW as the common edge, between planes EBW and MBW).
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0.6614245983884612
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<image>The height h of the cylinder is 18. Find the surface area of the cylinder.
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17140.5295
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<image>A rectangular wooden box slides down an inclined plane. When the box slides to the position shown in the figure, $$AB=\quantity{3}{m}$$, and it is known that the height of the box $$BE=\sqrt{3}\ \unit{m}$$, and the angle of the inclined plane is $$30^{ \circ }$$. Then the height of the box's end point $$E$$ above the ground $$AC$$ is $$EF=$$___$$\unit{m}$$.
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3
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<image>As shown in the figure, in a square ABCD with side length 4, an arc is drawn with point B as the center and AB as the radius, intersecting the diagonal BD at point E. The area of the shaded part in the figure is (result should be in terms of π)
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8-2π
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<image>As shown in the figure, $$DE$$ is the midline of $$\triangle ABC$$, point $$F$$ is on $$DE$$, and $$\angle AFB=90^{\circ}$$, if $$AB=5$$, $$BC=8$$, then the length of $$EF$$ is ___.
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$$1.5$$
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<image>As shown in the figure, in the cyclic quadrilateral ABCD inscribed in circle O, point E lies on the extension of BC, and ∠BOD = 160°. Find ∠DCE.
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80°
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<image>Find the area of the shaded part ______.
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13.76cm²
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<image>A chair costs 128 yuan. How much would 16 chairs cost? The vertical calculation on the right can be used to solve this. The step in the box calculates the cost of ______ chairs.
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10
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<image>As shown in the figure, in parallelogram $ABCD$, $E$ is a point on the extension of $AB$, and $DE$ intersects side $BC$ at point $F$. If $\frac{BE}{AE}=\frac{3}{7}$, then the value of $\frac{BF}{FC}$ is.
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$\frac{3}{4}$
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<image>Find the volume of the solid.
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72
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<image>Execute the program flowchart as shown. If the input is $n=10$ and $m=4$, then the output $p=$.
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5040
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<image>As shown in the figure, a circle with center $$M(-5,0)$$ and radius $$4$$ intersects the $$x$$-axis at points $$A$$ and $$B$$. Point $$P$$ is a moving point on the circle $$\odot M$$, different from $$A$$ and $$B$$. Lines $$PA$$ and $$PB$$ intersect the $$y$$-axis at points $$C$$ and $$D$$, respectively. A circle $$\odot N$$ with diameter $$CD$$ intersects the $$x$$-axis at points $$E$$ and $$F$$. The length of $$EF$$ is ___.
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$$6$$
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<image>In the figure, in $\Delta ABC$, $\angle BAC=98{}^\circ $, $EF$ and $MN$ are the perpendicular bisectors of $AB$ and $AC$, respectively. Then the measure of $\angle FAN$ is.
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$16{}^\circ $
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<image>Given the function $$y=f(x)$$ is differentiable within its domain $$(-3,6)$$, and its graph is shown in the figure. Its derivative function is $$y=f'(x)$$, then the solution set of the inequality $$f'(x)\leqslant 0$$ is ___.
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$$[-1,2]\cup [4,6)$$
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<image>As shown in the figure, it is a simple numerical operation program, then the value of x input is.
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$-1\pm \sqrt{5}$
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<image>As shown in the figure, point M is the midpoint of the angle bisector AT of △ABC. Points D and E are on sides AB and AC, respectively. Line segment DE passes through point M, and ∠ADE = ∠C. The ratio of the areas of △ADE and △ABC is:
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1:4
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<image>As shown in the figure, point $$A$$ lies on the hyperbola $$y=\dfrac{\sqrt{3}}{x}(x > 0)$$. A perpendicular line is drawn from point $$A$$ to the x-axis, with the foot of the perpendicular being point $$C$$. The perpendicular bisector of $$OA$$ intersects $$OC$$ at point $$B$$. When $$AC=1$$, the perimeter of $$\triangle ABC$$ is ___.
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$$1+\sqrt{3}$$
|
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<image>As shown in the figure, the equilateral triangle $$\triangle OAB$$ is rotated counterclockwise around point $$O$$ by $$150^{ \circ }$$, resulting in $$\triangle OA'B'$$ (where points $$A'$$ and $$B'$$ are the corresponding points of $$A$$ and $$B$$, respectively). Then, $$ \angle 1=$$___$$^{\circ}$$.
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$$150$$
|
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<image>Given, as shown in the figure, ∠ACD = 130°, ∠A = ∠B, then the measure of ∠A is °.
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65
|
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As shown in the figure, a geometric body is constructed by welding together small cubes of the same size. Its front view, top view, and left view all resemble the Chinese character "田" (field). The minimum number of small cubes required to weld this geometric body is $\qquad$.
<image>
|
6
|
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<image>As shown in the figure, given $\angle AOP=\angle BOP$, to make $\triangle AOP \cong \triangle BOP$, which of the following additional conditions is incorrect?
A. $\angle APO=\angle BPO$
B. $\angle OAP=\angle OBP$
C. $AO=BO$
D. $PO=OP$
|
D
|
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<image>As shown in the figure, the three views and related data (unit: $$cm$$) of a certain geometric body are given. The lateral surface area of the geometric body is ___$$cm^{2}$$.
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$$2\pi $$
|
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<image>Which of the following is a tangent to the circle? A. PM; B. ON; C. MQ; D. PQ
|
D
|
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<image>As shown in the figure, an arc of a circle passes through grid points A, B, and C in a Cartesian coordinate system, where the coordinates of point B are (4, 4). The coordinates of the center of the circle containing this arc are ______.
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(2, 0)
|
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<image>As shown in the figure, points $$D$$ and $$E$$ are on sides $$AB$$ and $$AC$$ of $$\triangle ABC$$, respectively, with $$AD:DB=2:1$$ and $$DE \parallel BC$$. Let $$\overrightarrow{AB}=\boldsymbol{a}$$ and $$\overrightarrow{AC} = \boldsymbol{b}$$. Then $$\overrightarrow{DE}=$$___ (expressed in terms of $$\boldsymbol{a}$$ and $$\boldsymbol{b}$$).
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$$\dfrac{2}{3} \overrightarrow{b}-\dfrac{2}{3} \overrightarrow{a}$$
|
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$如图,在三棱台ABC-A_1B_1C_1中,已知A_1A\perp 平面ABC,AB\perp AC,AB=AC=AA_1=2,A_1C_1=1,N为线段AB的中点,M为线段BC的中点.$
<image>
$求平面C_1MA与平面ACC_1 A_1所成角的余弦值;$
|
$\frac{2}{3}$
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As shown in the figure, the left view and the top view of a simple geometric body composed of small cubes of the same size are provided. The minimum number of small cubes required to form this geometric body is $\qquad$.
<image>
Left View
<image>
Top View
##
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5
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<image>As shown in the figure, $$A$$, $$B$$, $$C$$, and $$D$$ are four small islands at sea. Three bridges are to be built to connect these four islands. How many different bridge construction plans are there?
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$$16$$
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<image>Arrange the positive integers $$1$$, $$2$$, $$3$$, $$4$$, ... in a triangular array as shown in the figure. The 10th number from the left in the 10th row is ___.
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$$91$$
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Euclid30K Dataset
Paper | Project Page | Code
Spatial intelligence spans a rich suite of abilities, including visualising and transforming shapes, mentally rotating objects, judging relational positions and containment, and estimating numerosity.
However, it still remains a critical unresolved challenge for Multimodal Large Language Models (MLLMs).
To fill this gap, we propose to treat Euclidean geometry problem-solving as a surrogate task. Specifically, we meticulously constructed a curated multimodal dataset, called Euclid30K, comprising approximately 30K plane and solid geometry problems.
To enable the model to acquire and apply Euclidean principles from these geometry problems, we employed GRPO to finetune the Qwen2.5VL family and RoboBrain2.0 family, inspiring the models to identify shapes, count, and relate entities, and perform multi-step deductive reasoning using Euclidean principles.
Our experiments demonstrate that the resulting models achieve substantial zero-shot gains across four spatial reasoning benchmarks (Super-CLEVR, Omni3DBench, VSI‑Bench, and MindCube) without any task-specific adaptations. Notably, after training on the Euclid30K, the mean VSI‑Bench accuracy of all evaluated models rose from 34.5% to 40.5%, improving by 5.5 percentage points. Among them, RoboBrain2.0-Euclid‑7B achieves 49.6% accuracy, surpassing the previous state‑of‑the‑art model, Spatial‑MLLM.
To our knowledge, this is the first systematic study showing that geometry-centric fine-tuning can confer vision-language models with broadly transferable spatial skills.
Sample Usage
Below are instructions and code snippets for setting up the environment, training, and evaluation, adapted from the official GitHub repository.
1) Environment Setup
Training
- Install EasyR1 following the official documentation.
- Install the required Python dependencies:
pip install -r requirements.txt - Download the Euclid30K dataset from Hugging Face: https://huggingface.co/datasets/LiamLian0727/Euclid30K
Evaluation
- Install lmms‑eval following its official documentation. You can either:
- Use the
lmms-eval/copy included in the GitHub repository; or - Copy the four task folders provided under
test/lmms_eval/tasks/from the GitHub repository into your existing lmms‑eval setup.
- Use the
- Download the benchmark datasets Super‑CLEVR, Omni3DBench, VSI‑Bench, and MindCube_lmms_eval; then update the dataset paths in each corresponding YAML under
test/lmms_eval/tasks/.
2) Training
Below is an example command for training (e.g., 8 GPUs). For multi‑node multi‑GPU training, refer to the example script train/dist_train.sh in the GitHub repository.
python3 -m verl.trainer.main \
config=examples/config.yaml \
data.train_files=/mnt/datasets/Euclid30K/Euclid30K_train.parquet \
data.val_files=/mnt/datasets/Euclid30K/Euclid30K_val.parquet \
worker.actor.model.model_path=/mnt/models/Qwen2.5-VL-7B-Instruct \
trainer.experiment_name=EXPERIMENT_NAME \
worker.actor.micro_batch_size_per_device_for_update=1 \
worker.actor.micro_batch_size_per_device_for_experience=8 \
worker.actor.clip_ratio_low=0.2 \
worker.actor.clip_ratio_high=0.28 \
worker.reward.reward_function=/mnt/code/Euclids_Gift/train/euclid.py:compute_score \
algorithm.online_filtering=True \
trainer.total_epochs=10 \
trainer.n_gpus_per_node=8 \
trainer.nnodes=2 \
trainer.save_checkpoint_path=/mnt/models/Qwen2.5-VL-7B-Euclid
3) Evaluation
Use test/eval_qwen.sh, test/eval_robo.sh, and test/eval_euclid.sh from the GitHub repository to evaluate the Qwen2.5‑VL series, the RoboBrain 2.0 series, and Euclid models trained on Euclid30K, respectively.
Before running these scripts, set model_path in each script to the path of the model you want to evaluate.
Citation
If you find our dataset useful for your research, please cite us:
@misc{Euclids_Gift,
title={Euclid’s Gift: Enhancing Spatial Perception and Reasoning in Vision-Language Models via Geometric Surrogate Tasks},
author={Shijie Lian and Changti Wu and Laurence Tianruo Yang and Hang Yuan and Bin Yu and Lei Zhang and Kai Chen},
year={2025},
eprint={2509.24473},
archivePrefix={arXiv},
primaryClass={cs.CV},
url={https://arxiv.org/abs/2509.24473}
}
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