AP EAPCET 18 May 2024 Shift 1 Solved Paper

In triangle △ABC, given a=26,b=30, and cos‌C=‌

63

65

, we need to find the length of side c.
We know the cosine rule for any triangle is given by:
cos‌C=‌

a2+b2−c2

2ab

Substituting the known values:
‌

a2+b2−c2

2×a×b

=‌

63

65

This implied expression becomes:
‌

262+302−c2

2×26×30

=‌

63

65

Now, solve this step-by-step:
Calculate 262 and 302 :
262=676,‌‌302=900
Substitute these into the equation:
‌

676+900−c2

1560

=‌

63

65

Simplify the numerator:
676+900=1576
Substitute back:
‌

1576−c2

1560

=‌

63

65

Cross-multiply to solve for c2 :
65(1576−c2)=63×1560
Compute 63×1560 :
63×1560=98280
Now, solve for c2 :
65×(1576−c2)=98280
Simplify the expressions:
102440−65c2=98280
Rearrange to find c2 :
102440−98280=65c2
Solve:
4160=65c2
Divide by 65 to isolate c2 :
c2=‌

4160

65

=64
Take the square root:
c=√64=8
Thus, the value of c is 8 .