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In parallelogram ABCD. diagonals AC and DB intersect at E. Which statement is always true? Triangle AED is isosceles_ b) Triangle ABD is & right triangle. Triangle AEB is congruent to triangle AED_ Click here Triangle ABC is congruent to triangle CDA: dismiss)

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02:28

In the following figure, $\mathrm{ABCD}$ is a parallelogram, $\mathrm{CB}$ is extended to $\mathrm{F}$ and the line joining $\mathrm{D}$ and $\mathrm{F}$ intersect $\mathrm{AB}$ at $\mathrm{E}$. Then,(1) $\frac{\mathrm{AD}}{\mathrm{AE}}=\frac{\mathrm{BF}}{\mathrm{BE}}$(2) $\frac{\mathrm{AD}}{\mathrm{AE}}=\frac{\mathrm{CF}}{\mathrm{CD}}$(3) $\frac{\mathrm{BF}}{\mathrm{BE}}=\frac{\mathrm{CF}}{\mathrm{CD}}$(4) All of them are true

00:58

$\overline{\mathrm{AC}}$ and $\overline{\mathrm{BD}}$ bisect each other.a. Construct quadrilateral ABCD so that $\overline{A C}$ and $\overline{B D}$ are congruent, but not perpendicular. Classify the quadrilateral. Justify your answer.b. Construct quadrilateral $\mathrm{ABCDso}$ that $\overline{\mathrm{AC}}$ and $\overline{\mathrm{BD}}$ are perpendicular, but not congruent. Classify the quadrilateral. Justify your answer.

00:36

Determine which pairs of segments or angles must be congruent so that you can prove that ABCD is the indicated quadrilateral. Explain your reasoning. (There may be more than one right answer.)isosceles trapezoid

02:46

Which congruence statement correctly indicates that the two given triangles are congruent?A) $\triangle A B C \cong \triangle E F D$B) $\triangle A B C \cong \triangle F D E$C) $\triangle A B C \cong \triangle D E F$D) $\triangle A B C \cong \triangle F E D$

Transcript

in this question, we need to find which statement is true. The question says that having a parallelogram A. B. C. D. Which is the A. C. Is intersect. A. C. And B. D. Is diagnosed intersect at point E. So first we draw here a parallelogram parallelogram. So here is a telegram having the opposite side is equal and palace. So there is A. B. C. B. A. C. And be be diagnosed intersect at point mm hmm. And here is if we take a triangle in triangle abc and triangle D. C. A. A. B. C. That means these triangles and B. C. A. This triangle.…

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