MCQMediumJEE 2023Applications of Derivatives (Monotonicity, Extrema)

JEE Mathematics 2023 Question with Solution

If the functions f(x)=x33+2bx+ax2f(x) = \frac{x^3}{3} + 2bx + \frac{ax}{2} and g(x)=x33+ax+bx2,a2bg(x) = \frac{x^3}{3} + ax + bx^2, a \neq 2b have a common extreme point, then a+2b+7a + 2b + 7 is equal to:

  • A

    44

  • B

    32\frac{3}{2}

  • C

    33

  • D

    66

Answer

Correct answer:C

Step-by-step solution

Standard Method

Given: f(x)=x33+2bx+ax2f(x) = \frac{x^3}{3} + 2bx + \frac{ax}{2} and g(x)=x33+ax+bx2g(x) = \frac{x^3}{3} + ax + bx^2 with a2ba \neq 2b.

Find: The value of a+2b+7a + 2b + 7 when the two functions have a common extreme point.

For a common extreme point, the corresponding stationary point must be common. From the extracted solution:

f(x)=x2+2b+axf'(x) = x^2 + 2b + ax

and

g(x)=x2+a+2bxg'(x) = x^2 + a + 2bx

Subtracting,

(2ba)x(2ba)=0(2b-a) - x(2b-a) = 0

Since a2ba \neq 2b, we get

x=1x = 1

So x=1x=1 is the common root.

Put x=1x=1 in f(x)=0f'(x)=0 or g(x)=0g'(x)=0:

1+2b+a=01 + 2b + a = 0

Therefore,

a+2b+7=6a + 2b + 7 = 6

Hence, the correct value is 66.

Discrepancy note: The worked solution concludes the value is 66, which corresponds to option D, but the solution labels the correct option as C. The numerical conclusion from the working is authoritative.

Why the common stationary point is $$x=1$$

At a common extreme point, both derivatives must vanish at the same value of xx.

Using the expressions shown in the solution:

f(x)=x2+2b+axf'(x) = x^2 + 2b + ax g(x)=x2+a+2bxg'(x) = x^2 + a + 2bx

Now subtract the second from the first:

f(x)g(x)=(x2+2b+ax)(x2+a+2bx)f'(x) - g'(x) = (x^2 + 2b + ax) - (x^2 + a + 2bx) =2ba+ax2bx= 2b - a + ax - 2bx =(2ba)x(2ba)= (2b-a) - x(2b-a)

So,

(2ba)(1x)=0(2b-a)(1-x) = 0

Given a2ba \neq 2b, we must have

1x=01-x = 0

Therefore,

x=1x=1

Substituting into the stationary condition,

1+2b+a=01 + 2b + a = 0

Thus,

a+2b=1a+2b = -1

and hence

a+2b+7=6a+2b+7 = 6

Therefore, the correct option should be D from the listed options.

Common mistakes

  • Using the option label from the solution's without checking the algebra. Here the page marks C, but the working gives the value 66. Always trust the derived result and then map it to the option list.

  • Assuming a common extreme point means equating f(x)=g(x)f(x)=g(x) only. For an extreme point, the required condition is that both derivatives vanish at the same xx. Start with f(x)=0f'(x)=0 and g(x)=0g'(x)=0.

  • Missing the condition a2ba \neq 2b while solving (2ba)(1x)=0(2b-a)(1-x)=0. If this condition is ignored, one may stop too early. The given restriction forces x=1x=1.

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