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Question
In the given figure, AB = AC, AD ⊥ BC, ∠PAC = 102°. Find the values of x and y.
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Solution
Given:
△ABC is isosceles with AB = AC
AD ⊥ BC → AD is the altitude from A to BC
∠PAC = 102°
We are asked to find x = ∠BAD and y = ∠ABC
Step 1: Analyze the figure
Since AB = AC, △ABC is isosceles with base BC
AD is altitude and in an isosceles triangle, the altitude from the vertex also bisects the base and the opposite angle.
So, BD = DC.
∠BAD = ∠CAD
Let ∠BAD = x.
Then, ∠CAD = x
Given ∠PAC = 102° → This is an exterior angle along AD.
Actually, ∠PAC = ∠BAD + ∠CAD = x + x = 2x or possibly 180 – 2x, depending on configuration.
Step 2: Relate given angle to x
AD is altitude → right angle at D
∠PAC = 102° is the angle at vertex A, outside the small triangle formed by the altitude
For an isosceles triangle with vertex A and base BC: ∠BAC = 2x
Since ∠PAC = 102°, it must be related to the exterior angle at A:
∠PAC = 180 – ∠BAC = 180 – 2x
Substitute the given:
180 – 2x = 102
2x = 78
x = 39°
Step 3: Reconsider configuration
∠PAC = ∠BAD + ∠DAC
In isosceles triangle,
∠BAD = ∠DAC = x
So, ∠PAC = ∠BAD + ∠DAC
= x + x
= 2x
Given ∠PAC = 102°
⇒ 2x = 102
⇒ x = 51°
Step 4: Find ∠ABC = y
In isosceles triangle, ∠ABC = ∠ACB = y
Sum of angles in triangle:
∠ABC + ∠ACB + ∠BAC = 180
y + y + ∠BAC = 180
2y + ∠BAC = 180
∠BAC = 2x = 102°
2y + 102 = 180
2y = 78
y = 39°
