Complete the following activity to divide 84 into two parts such that the product of one part and square of the other is maximum. Solution: Let one part be x. Then the other part is 84 - x Letf (x) = x2 (84 - x) = 84x2 - x3 &there4; f'(x) = `square` and f''(x) = `square` For extreme values, f'(x) = 0 &there4; x = `square "or" square` f(x) attains maximum at x = `square` Hence, the two parts of 84 are 56 and 28.

Let one part be x. Then the other part is 84 - x Letf (x) = x2 (84 - x) = 84x2 - x3 &there4; f'(x) = `bb(168x - 3x^2)` and f''(x) = `bb(168-6x)` For extreme values, f'(x) = 0 &there4; x = 0 or 56 Now, f''(0) = 168 - 6(0) = 168 < 0 &there4; f (x) attain minimum at x = 0 Also, f''(56) = 168 - 6(56) = 168 - 336 = -168 < 0 f(x) attains maximum at x = 56 Hence, the two parts of 84 are 56 and 28.