Welcome to your ACT 1 Geo: Use various methods, including SSS

$Q1:$ If two sides of a triangle are congruent, the angles opposite these sides are

$Q_{2}:$ If three sides of a triangle are congruent, then

$Q_{3}:$ Which pair of triangles has enough given information to prove that the triangles are congruent?

$Q_{4}:$ Triangles are congruent if they have ............

$Q_{5}:$ If three sides of one triangle are congruent to three sides of another, then the triangles are congruent, is

$Q_{6}:$ If two angles and the included side of one triangle are congruent to two angles and the included side of another, then the triangles are congruent, is

$Q_{7}:$ Which of the following triangles are congruent?

$Q_{8}:$ Let $\Delta JHK$ is congruent to $\Delta JHI$ and the two triangles share $\overline JH$, $\angle K$ is congruent to $\angle I$ and $\angle JHK $is congruent to $\angle JHI$. So you can conclude that

$Q_{9}:$ In the figure given, $ABCD$ is a rectangle. If $DE$ is $3$, what is the length of $AB$?

$Q_{10}:$ Which of the following is true about those two triangles are congruent?

$Q_{11}:$ This two triangles are congruent by

$Q_{12}:$ This two triangles are congruent by

$Q_{13}:$ This two triangles are congruent by

$Q_{14}:$ This two triangles are congruent by

$Q_{15}:$ This two triangles are congruent by

$Q_{16}:$ If this two triangles are congruent, then $L=$

$Q_{17}:$ Which of the following is true

$Q_{18}:$ If $ABC \cong PQR$, then $x=$

$Q_{19}:$ Which of the following pairs triangles are not congruent by $ASA$ or $AAS$

$Q_{20}:$ Which of the following pairs triangles are congruent by $HL$ only

$Q_{21}:$What addition information is needed for a $SAS$ congruence correspondence?

$Q_{22}:$ In figure below, $\Delta ABD \cong \Delta ......... $

$Q_{23}:$ In figure below, $\Delta TSU \cong \Delta ......... $

$Q_{24}:$ You are given two triangles, and all three pairs of corresponding sides are congruent. Which congruence criterion can be used to conclude that the triangles are congruent?

$Q_{25}:$ In two triangles, one angle of the first triangle is congruent to one angle of the second triangle, and the lengths of the sides containing these angles are congruent. Which congruence criterion can be used to conclude that the triangles are congruent?

$Q_{26}:$ You have two right triangles, and the hypotenuse of one triangle is congruent to the hypotenuse of the other triangle, and one pair of legs is congruent. Which congruence criterion can be used to conclude that the right triangles are congruent?

$Q_{27}:$ Two triangles have two angles congruent to the corresponding angles of the other triangle, and the included side is congruent. Which congruence criterion can be used to conclude that the triangles are congruent?