Similar and Congruent Triangles

INTRO TO MATH 426

SIMILAR AND CONGRUENT TRIANGLES

BANK OF QUESTIONS FOR EXTRA PRACTICE

To draw the plans for a roof, we first draw horizontal segment AC. Then, from the midpoint of segment AC, we draw perpendicular DB. Finally, we draw segments AB and BC.

Using a formal proof, show that triangles ABD and CBD are congruent.

In which of the following situations is there sufficient information to conclude that triangles ABC and DEF are congruent?

A) / m A = 70m B = 35m C = 75
m D = 70m E = 35m F = 75
B) / m A = 70m B = 35m = 5 cm
m D = 70m E = 35m = 5 cm
C) / m A = 70m C = 75m = 10 cm
m D = 70m F = 75m = 10 cm
D) / m A = 70m = 5 cmm = 10 cm
m D = 70m = 5 cmm = 10 cm

In the figure on the right,


AOB COD
O is the midpoint of segments BF, DH, CG and AE. /

Which property can be used to prove that the 4triangles are congruent?

A) / A.A. / C) / S.A.S.
B) / S.S.S. / D) / A.S.A.

In which of the following situations is there enough information to conclude that triangles ABC and DEF are congruent?

A) / m B = 45m = 12 cm m = 6 cm
m E = 45m = 12 cm m = 6 cm
B) / m C = 60m = 4 cmm = 9 cm
m F = 60m = 4 cmm = 9 cm
C) / m A = 75m B = 45m = 8 cm
m D = 75m E = 45m = 8 cm
D) / m A = 75m C = 60m = 10 cm
m D = 75m F = 60m = 10 cm

In triangle ABC below, is parallel to .

The following reasoning indicates how the measure of can be calculated.

STATEMENT / JUSTIFICATION
1. / B B / 1. / By reflexivity
2. / BA'C' BAC / 2. / If a transversal cuts two parallel lines, then the corresponding angles are congruent.
3. / BA'C' ~ BAC / 3. / Two triangles which have two corresponding angles congruent are similar (AA).
4. / / 4. / ?

Which justification completes the reasoning in step 4?

A) / In similar triangles, corresponding angles are congruent.
B) / In similar triangles, corresponding sides are congruent.
C) / In similar triangles, the measures of corresponding sides are proportional.
D) / In similar triangles, the measures of corresponding angles are proportional.

In the adjacent figure, is parallel to .
The following steps can be used to determine the measure of . /
Statements / Justifications
1 / m ACB = m DCE / 1 / Vertically opposite angles are congruent.
2 / m BAC = m CDE / 2 / If a secant cuts two parallel lines, then the alternate interior angles are congruent.
3 / ABC ~ CDE / 3 / Two triangles are similar if they have respectively at least two congruent angles (AA).
4 /
/ 4 / ?

Which justification completes the reasoning in step 4?

A) / If two triangles are similar, their corresponding angles areproportional.
B) / If two triangles are similar, their corresponding sides are proportional.
C) / Triangles are similar if the measures of their corresponding sides are proportional.
D) / Triangles are similar if the measures of their corresponding angles are proportional.

In the figure below, diagonal AC bisects angles A and C.

Which property can be used to prove that triangles ABC and ADC are isometric?

A) / If the corresponding sides of two triangles are isometric, then the triangles are isometric.
B) / If two angles and the contained side of one triangle and the corresponding two angles and contained side of another triangle are isometric, then the triangles are isometric.
C) / If two sides and the contained angle of one triangle and the corresponding two sides and contained angle of another triangle are isometric, then the triangles are isometric.
D) / If two angles of one triangle and the two corresponding angles of another triangle are isometric, the triangles are isometric.

Which of the four pairs of triangles below consists of two triangles that are definitely congruent?

A) / / C) /
B) / / D) /

In the following figure:

Lines RC and DQ are parallel.
Lines BD and CP intersect at point A.
m  CBD = 120
m  QEP = 40 /

The following is part of a procedure used to determine the measure of angle BAC.

Step 1 / m ABC + m CBD = 180
m ABC + 120 = 180
m ABC = 60 / because ...
Step 2 / m BCA = m QEP = 40 / because ...
Step 3 / m ABC + m BCA + mBAC = 180
60 + 40 + mBAC = 180
mBAC = 80 / because the sum of the measures of the interior angles of a triangle is 180.

Complete steps 1 and 2 of this procedure.

In the diagram below, line segmentsAE and BD intersect at C.

In addition:
/

The following is part of a procedure used to show that ABCEDC.

Step 1BCA DCE
because vertically opposite angles are congruent.
Step 2 because
Step 3ABC ~ EDC
because ...
Step 4ABC EDC
because ...

Complete steps 3 and 4 of this procedure.

In the figure to the right, segments DE and CB are parallel and they measure 6units and 10units respectively. Segment EB measures 3units. /

What is the measure of segment AE?

A) / 2 units / C) / 5 units
B) / 4.5 units / D) / 7.5 units

State the property by which you can conclude that triangle Z is congruent to triangle Y.

m
m
m / / m A = 56
m B = 36
m C = 88
m
m
m /

The figure below shows triangle ABC and triangle ADE. The data given on the figure can be used to prove that these triangles are congruent.

Below is the reasoning which shows that triangle ABC is congruent to triangle ADE.

STATEMENT / JUSTIFICATION
1.m C = m E = 90

m BAC = 25
m ADE = 65 / 1.These data are given in the problem.
2.m DAE = 25 / 2.The acute angles in a right triangle are
complementary.
3.m BAC = m DAE / 3.By transitivity
4.ABC ADE / 4. ?

Which of the following is the justification for statement 4?

A) / Two triangles are congruent if they have one congruent angle bounded by two corresponding congruent sides.
B) / Two triangles are congruent if they have three corresponding congruent sides.
C) / Two triangles are congruent if they have one congruent side between two corresponding congruent angles.
D) / Two triangles are congruent if they have two corresponding congruent angles.

Correction key

Work : (example)

Statements / Justifications
1. /  / 1. / The hypothesis states that D is the midpoint of segment AC.
2. /  / 2. / Reflexive property.
3. / ADB CDB / 3. / The hypothesis states that .
4. / ABD CBD / 4. / If two sides and the contained angle of one triangle are congruent to two sides and the contained angle of another triangle, then the triangles are congruent.
or
S-A-S.

C C B C

B B D

Step 1 / m ABC + m CBD = 180
m ABC + 120 = 180
m ABC = 60 / becauseadjacent angles whose external sides are in a straight line are supplementary.
Step 2 / m BCA = m QEP = 40 / becausealternate exterior angles are congruent when formed by a transversal intersecting two parallel lines.
Step 3 / m ABC + m BCA + mBAC = 180
60 + 40 + mBAC = 180
mBAC = 80 / because the sum of the measures of the interior angles of a triangle is 180.

Step 3ABC ~ EDC
becauseif the lengths of two sides of one triangle are proportional to the lengths of the two corresponding sides of another triangle and the contained angles are congruent, then the triangles are similar.
Step 4ABC EDC
becausethe corresponding angles of similar figures are congruent.

If three sides of one triangle are congruent to three sides of another triangle, the two triangles are congruent.