Answer:
22°, 79° and 79°
Explanation:
Let x be the vertex angle and y each of the congruent angles.
The sum of all angles =180°
So x + y + y = 180
x + 2y = 180 ·········· Equation (1)
Given "The measure of each of the congruent angles of an isosceles triangle is 9 less than 4 times the vertex angle", the equation is
y = 4x - 9
Substitute for y in terms of x in equation 1
⇒ x + 2(4x - 9) = 180
⇒ x + 8x - 18 = 180
⇒ 9x - 18 = 180
⇒ 9x = 180 + 18
⇒ 9x = 198
⇒ x = 198/9 = 22
So vertex angle is 22°
Substituting for x in Equation 1:
22 + 2y = 180
2y = 180 - 22
2y = 158
y = 158/2
y = 79°
So each congruent angle is 79°