JEE Main 2023 (Online) 30th January Morning Shift | Application of Derivatives Question 41 | Mathematics

Let the function $$f(x) = 2{x^3} + (2p - 7){x^2} + 3(2p - 9)x - 6$$ have a maxima for some value of $$x < 0$$ and a minima for some value of $$x > 0$$. Then, the set of all values of p is

$$\left( { - {9 \over 2},{9 \over 2}} \right)$$

$$\left( {{9 \over 2},\infty } \right)$$

$$\left( {0,{9 \over 2}} \right)$$

$$\left( { - \infty ,{9 \over 2}} \right)$$

JEE Main 2023 (Online) 25th January Morning Shift

MCQ (Single Correct Answer)

-1

Let $$x=2$$ be a local minima of the function $$f(x)=2x^4-18x^2+8x+12,x\in(-4,4)$$. If M is local maximum value of the function $$f$$ in ($$-4,4)$$, then M =

$$18\sqrt6-\frac{33}{2}$$

$$18\sqrt6-\frac{31}{2}$$

$$12\sqrt6-\frac{33}{2}$$

$$12\sqrt6-\frac{31}{2}$$

JEE Main 2023 (Online) 25th January Morning Shift

MCQ (Single Correct Answer)

-1

Let $$f:(0,1)\to\mathbb{R}$$ be a function defined $$f(x) = {1 \over {1 - {e^{ - x}}}}$$, and $$g(x) = \left( {f( - x) - f(x)} \right)$$. Consider two statements

(I) g is an increasing function in (0, 1)

(II) g is one-one in (0, 1)

Then,

Both (I) and (II) are true

Neither (I) nor (II) is true

Only (II) is true

Only (I) is true

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