△LMN is isosceles, with ∠M≅∠L and m∠L=36° . What are the measures of angles M and N ?

Since △LMN is isosceles, we know that ∠M≅∠L.

We are given that m∠L=36°.

Since ∠M≅∠L, we can conclude that m∠M=36° as well.

Since ∠M and ∠N are angles in a triangle, we know that the sum of the angles in a triangle is 180°.

In this case, ∠M + ∠L + ∠N = 180°.

Substituting the given information, we have:

36° + 36° + ∠N = 180°.

Combining like terms, we have:

72° + ∠N = 180°.

Subtracting 72° from both sides, we have:

∠N = 108°.

Therefore, the measures of angles M and N are 36° and 108°, respectively.

In △MNO , m∠M=78° , m∠N=34° , and m∠O=68° . In △RST , m∠S=68° , m∠R=78° , and m∠T=34° . Describe the pairs of congruent corresponding angles in the two triangles.(1 point)
Responses

∠M≅∠S , ∠N≅∠T , ∠O≅∠R

∠M≅∠T , ∠N≅∠R , ∠O≅∠S

∠M≅∠R , ∠N≅∠T , ∠O≅∠S

∠M≅∠R , ∠N≅∠S , ∠O≅∠T

The correct answer is:

∠M≅∠R , ∠N≅∠T , ∠O≅∠S

Which similarity statement describes the relationship between a triangle with angles m∠A=48° , m∠B=17° , and m∠C=115° and another triangle with angles m∠H=17° , m∠I=48° , and m∠J=115° ?(1 point)

△BAC∼△HIJ

△CAB∼△JHI

△BCA∼△JIH

△ABC∼△HIJ

The correct answer is:

△ABC∼△HIJ

Show the similarity between a triangle with angles A , B , and C , where m∠A=47° and m∠B=36° , and another triangle with angles G , H , and J , where m∠G=36° and m∠J=97° .(1 point)
Responses

△ABC∼△HGJ

△ABC∼△GHJ

△ABC∼△HJG

△ABC∼△GJH

The correct answer is:

△ABC∼△GJH

△TUV is isosceles, with ∠T≅∠V and m∠U=54° . What is m∠T ?

m∠T=54°

m∠T=63°

m∠T=36°

m∠T=126°

Since △TUV is isosceles, we know that ∠T≅∠V.

We are given that m∠U=54°.

Since ∠T≅∠V, we can conclude that m∠V=54° as well.

Since ∠T and ∠V are angles in a triangle, we know that the sum of the angles in a triangle is 180°.

In this case, ∠T + ∠U + ∠V = 180°.

Substituting the given information, we have:

∠T + 54° + 54° = 180°.

Combining like terms, we have:

∠T + 108° = 180°.

Subtracting 108° from both sides, we have:

∠T = 72°.

Therefore, m∠T = 72°.