Give that m/_ y=39, find the measures of angles a and b

Question

asked Mar 25, 2023 215k views

2 Answers

Warre Buysse · Answer 1 · 2023-03-27T18:32:56+0000

$\huge\mathbb{ \underline{SOLUTION :}}$

In the given figure, angles a and y are vertically opposite angles. The measure of vertical angles is equal, therefore :-

$\small\longrightarrow\sf{m<a = m<y}$

$\small\longrightarrow\sf{m<a= \: 39^\circ}$

Next, angles a and 90° are the opposite interior angles to the exterior angle b. By the triangle theorem below :-

$\small\longrightarrow\sf{m<b=m<a+90^\circ}$

$\small\longrightarrow\sf{39^\circ+90^\circ}$

•
$\small\longrightarrow\sf{m<b= 129^\circ}$

$\huge \mathbb{ \underline{ANSWER:}}$

m<a=
$\large\sf{\boxed{\sf 39^\circ}}$

m<b =
$\large\sf{\boxed{\sf 129^\circ}}$

Ankit Dubey · Answer 2 · 2023-03-29T09:15:44+0000

Answer:

∠a = 39°

∠b = 129°

Explanation:

Vertical angles are congruent. An exterior angle of a triangle is equal to the sum of the remote interior angles.

Angle y and angle 'a' are vertical angles, so congruent.

∠a = ∠y = 39°

The angle marked 'b' is an exterior angle to the triangle. Its remote interior angles are 'a' and the one marked 90°.

∠b = ∠a +90° = 39° +90°

∠b = 129°