Given, f(x) = x^3 – 12x^2 + 45x + 8. What is the minimum value of f(x)?(a) -1(b) 0(c) 1(d) Value does not existI have been asked this question during an online exam.Enquiry is from Calculus Application in section Application of Calculus of Mathematics – Class 12

Given, f(x) = x^3 – 12x^2 + 45x + 8. What is the minimum value of f(

1.	Given, f(x) = x^3 – 12x^2 + 45x + 8. What is the minimum value of f(x)?(a) -1(b) 0(c) 1(d) Value does not existI have been asked this question during an online exam.Enquiry is from Calculus Application in section Application of Calculus of Mathematics – Class 12
Answer» Right answer is (c) 1 The explanation: We have, f(x) = x^3 – 12x^2 + 45x + 8……….(1) Differentiating both sides of (1) with respect to x we f’(x) = 3x^2 – 24x + 45 3x^2 – 24x + 45 = 0 Or x^2 – 8x + 15 = 0 Or(x – 3)(x – 5) = 0 THUS, either x – 3 = 0 i.e., x = 3 or x – 5 = 0 i.e., x = 5 Therefore, f’(x) = 0 for x = 3 and x = 5. If h be a positive quantity, however SMALL, then, f’(5 – h) = 3(5 – h – 3)(5 – h – 5) = -3h(2 – h) = negative. f’(5 + h) = 3(5 + h – 3)(5 + h – 5) = 3h(2 + h) = positive. Clearly, f’(x) changes SIGN from negative on the left to positive on the right of the point x = 5. So, f(x) has minimum at 5. Putting, x = 5 in (1) Thus, its maximum value is, f(3) = 5^3 – 125^2 + 455 + 8 = 58.

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