Chapter four math test- Rathbun Geometry

Show Triangle ABD = Triangle CDB and a=3

1. 3+7 2.4(3)-2 3.16 4.16 5.SAS

Given: P is the midpoint of TQ and RS. Prove: triangle TPR= triangle QPS

1. Definition of a midpoint 2.<TPR=<QPS 3.SAS

The figure shows part of the roof structure of a house. Use SAS to explain why triangle RTS = RTU

1. ST=UT 2.<RTS=<RTU 3.RT=RT

Tom is wearing his favorite bow tie to the school dance. The bow tie is in the shape of two triangles. Given: AB=ED, BC=DC, AC=EC, <=<E prove: triangle ABC = triangle EDC

1. Vertical Angles Theorem 2.Third Angles Theorem 3. Triangle ABC = triangle EDC

Given: <MLN=<PLO, <MNL=<POL, MO=NP prove: triangle MLP is isosceles

1.AAS 2.CPCTC

Daphne folded a triangle sheet of paper into the shape shown. Find m<ECD, given m<CAB-61 degrees, M<ABC- 22 degrees, and M<BCD- 42 degrees

41 degrees

Find m<K

63 degrees

Two Seyfert galaxies, BW Tauru and M77, represented by points A and B, are equidistant from Earth, represented by point C. What is M<A?

65 degrees

Given: triangle ABC= triangle MNO Identify all pairs of congruent corresponding parts

<A=<M, <B=<N, <C=<M, AB=NO, BC=MN, AC=MO

What additional infomation do you need to prove triangle ABC= triangle ADC by SAS Postulate

<ACB=<ACD

Triangle ABC is an isosceles triangle. AB is the longest side with length 10x+6. BC=5x+4 and CA=4x+8

AB=46

Given the lengths marked on the figure and thatAD bisects BE, use SSS to explain why triangle ABC= triangle DEC

AC=CD, AB=ED, BC=CE

Determine if you can use ASA to prove triangle CBA= triangle CED. Explain

AC=DC is given. <CAB=<CDE because both are right triangles. BY the vertical Angles Theorem. <ACB=<DCE. Therefore triangle CBA=Triangle CED by ASA

Position a right triangle with leg lengths r and 2s+4 in the coordinate plane and give the coodinates of each vertex

Both a and b

Apply the transformation M to the triangle with the given vertices. Identify and describe the transformation

C.

Find CA

CA=14

A pilot uses a triangle to find the angle of elevation <A from the ground to her plane. How can she find M<A?

D. triangle ABO= triangle CDO by SAS and <A=<C by CPCTC, so m<A=40 degrees by substitution

Find m<Q

M<Q=75 degrees

Determine whether or not the lines are perpendicular. Explain your answer

THe slope of LM= -1/2 and the slope of MN=-1/2. LM is perpendicular to MN because -1/2(2)=-1

For these triangles, select the triangle congruence statement and the postulate or theorem that supports it

Triangle ABC= Triangle JKL, SAS

Find the value of X.

X=6

Classify triangle ABC by its side lengths

equilateral triangle

Find the measures of each numbered angle

m<1=54, m<2=63, m<3=63

Given that triangle ABC= triangle DEC and m<E=23 degrees, find M<ACB

m<ACB= 67 degrees

FInd m<DCB, given <A=<F, <B=<E, and m<CDE- 40 degrees

m<DCB-40 degrees

Classify triangle DBC by its angle measures, given m<DAB=60 degrees, m<ABD=75 degrees, and m<BDC=25 degrees

obtuse triangle

Two sides of an equilateral triangle measure (2y+3) units and (Y squared -5+ units. If the perimeter of the triangle is 33 units, what is the value of y

y=4