Similar Triangles

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No

Are these triangles similar?

yes, SAS

Are these triangles similar? How?

yes, SSS

Are these triangles similar? How?

yes, AA, 17.5

Are these triangles similar? How? Find the height of the tree.

ABC similar to ACD; ABC similar to CBD; ACD similar to CBD; they are all similar by AA Similarity.

CHALLENGE!!! Triangle ABC is similar to the two triangles formed by altitude CD, and these two triangles are similar to each other. Write three similarity statements about these to each other

Yes, AA Sim

Determine whether the pair of triangles is similar. Justify your answer (AA Sim, SSS Sim, SAS Sim)

AE=15

Find AE if AB=12, AC=16, and ED=5.

CD=9

Find CD if AE=8, ED=4, and BE=6.

6

Find the length of BC

3

Find the length of CE

12.5

Find the perimeter of triangle WZX if it is similar to SRT given ST=6, WX=5, and the perimeter of triangle STR=15.

2

Find the scale (z00m) factor.

x=18 y=3

Find x and y.

x=2 y=5

Find x and y.

x=10

Find x so that GJ is parallel to KF if GF=18, HG=x-4, JK=15, and HJ=x-5.

x=8

Find x so that GJ is parallel to KF if GF=6, HG=12, HJ=8, and JK=x-4.

x=15

Find x.

x=6

Find x.

triangle ADE is similar to triangle CBE; x=2; AE=8; DE=4

Identify the similar triangles. Find x and the measures of the indicated sides.

triangle PQR is similar to triangle TSR; x=40/3; PT=20/3; ST=50/3

Identify the similar triangles. Find x and the measures of the indicated sides.

AD=4

If DB=24, AE=3, and EC=18, find AD.

Answer #1: AA postulate

Question #1:

Answer #2: No, all corresponding angles in similar triangles need to be congruent.

Question #2:

Answer #3: Yes, ∆RKS ∼∆LPD

Question #3:

Answer #4: Yes, ∆RTV ∼∆STU

Question #4:

AA

What shortcut shows that these triangles similar?

SAS

What shortcut shows that these triangles similar?

SSS

What shortcut shows that these triangles similar?

D

Which triangle is not similar?

5.6

find a

4.8

find b

SSS similarity

if three sides of one triangle are proportional to the three corresponding sides of another triangle, then the triangles are similar

AA similarity

if two angles of one triangle are congruent to two angles of another triangle, then the triangles are similar

SAS similarity

if two sides of one triangle are proportional to two sides of another triangle and their included angles are congruent, then the triangles are similar

x=6.75

Find x.

Yes, SAS Sim (1 to 1 ratio)

Determine whether the pair of triangles is similar. Justify your answer (AA Sim, SSS Sim, SAS Sim)


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