Question
1. The four triangles are ∆ACB, , ∆DGB ∆DFE, and ∆BHE .
2. In order for triangles to be similar, certain relationships must exists between two
or three pairs of corresponding parts.
3. a. ∆ ∆ ACB DGB ∆DFE BHE ∆ ;Possible plan: Use the parallel lines and
transversals to show that ∠A ≅ ∠EDF ≅ ∠EBH and ∠E ≅ ∠ABC.Then use the
AA Similarity Postulate.
b. AB DE DB BE
AC DF DG BH = = =
4. CZ , ZY , and YX are proportional as stated in the Corollary to the Side-Splitter
Theorem: If three parallel lines intersect two transversals, then the segments
intercepted on the transversals are proportional.
5. Possible plan: Use the Similar Triangles and the Segment Addition Postulate to
write and solve a proportion to find the length ofGZ .
6. a. BE = 15 in., BX = 9 in., EX = 12 in.
Possible Plan: Use the fact that the diagonals of a kite are perpendicular to
show that ∆BEC is a right triangle with right∠BEC. Then use the fact
that EX is the altitude to the hypotenuse to write and solve proportions to find
the lengths of BX and EX.
b–d. XEFY: XE = 12 in., EF = 7.5 in., FY = 7.5in., XY = 6 in.,
YFGZ: YF = 7.5 in., FG = 2.5 in., GZ = 6 in., YZ = 2 in.
∆ZGC :ZG = 6 in., GC = 10 in., ZC = 8 in.
Possible plan: Use the fact that ∆ ∆ CXE EXB to write and solve a
proportion to find the length ofCE. Then use the extended ratio to write and
solve an equation to find the lengths of XY,YZ, and ZC . From the Corollary
to the Side-Splitter Theorem, EF: FG: GC is also 3:1:4. Use the extended
ratio to write and solve an equation to find the lengths of EF, FG, and GC .
By the AA similarity Postulate, ∆CXE ∆CYF CZG ∆ . Use the Similar
Triangles and the Segment Addition Postulates to write and solve proportions
to find the lengths ofYF and ZG
2. In order for triangles to be similar, certain relationships must exists between two
or three pairs of corresponding parts.
3. a. ∆ ∆ ACB DGB ∆DFE BHE ∆ ;Possible plan: Use the parallel lines and
transversals to show that ∠A ≅ ∠EDF ≅ ∠EBH and ∠E ≅ ∠ABC.Then use the
AA Similarity Postulate.
b. AB DE DB BE
AC DF DG BH = = =
4. CZ , ZY , and YX are proportional as stated in the Corollary to the Side-Splitter
Theorem: If three parallel lines intersect two transversals, then the segments
intercepted on the transversals are proportional.
5. Possible plan: Use the Similar Triangles and the Segment Addition Postulate to
write and solve a proportion to find the length ofGZ .
6. a. BE = 15 in., BX = 9 in., EX = 12 in.
Possible Plan: Use the fact that the diagonals of a kite are perpendicular to
show that ∆BEC is a right triangle with right∠BEC. Then use the fact
that EX is the altitude to the hypotenuse to write and solve proportions to find
the lengths of BX and EX.
b–d. XEFY: XE = 12 in., EF = 7.5 in., FY = 7.5in., XY = 6 in.,
YFGZ: YF = 7.5 in., FG = 2.5 in., GZ = 6 in., YZ = 2 in.
∆ZGC :ZG = 6 in., GC = 10 in., ZC = 8 in.
Possible plan: Use the fact that ∆ ∆ CXE EXB to write and solve a
proportion to find the length ofCE. Then use the extended ratio to write and
solve an equation to find the lengths of XY,YZ, and ZC . From the Corollary
to the Side-Splitter Theorem, EF: FG: GC is also 3:1:4. Use the extended
ratio to write and solve an equation to find the lengths of EF, FG, and GC .
By the AA similarity Postulate, ∆CXE ∆CYF CZG ∆ . Use the Similar
Triangles and the Segment Addition Postulates to write and solve proportions
to find the lengths ofYF and ZG
Answers
GPT 3.5
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