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AAKASH SERIES-MAXIMA AND MINIMA -PRACTICE SHEET (EXERCISE -I) (LEVEL -I) (STRAIGHT OBJECTIVE TYPE QUESTIONS)
- The number of stationary points of f(x) = cosx in [0,2pi] are
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- The values of 'x' at which f(x) = sinx is stationary are given by
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- Stationary point of y=(logx)/(x)(xgt0) is
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- The function f(x)=x^(1//x) has stationary point at
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- The maximum value of x^(4)e^(-x^(2)) is
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- The minimum value of f(x)=x^(2)+(250)/(x) is
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- If 2xy=5 then the maximum value of x^(2)+3xy+y^(2) is
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- The maximum value of -x^(2)-8x+17 is
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- If xgt 0 the minimum value of x^x is
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- Let f(x)=x^(3)-x^(2)+12x-3 then at x=2 , f(x) has
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- The maximum of f(x)=2x^(3)-9x^(2)+12x+4 occurs at x=
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- f(x)=(x)/(1+xtanx) is maximum when x=
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- f(x) = sin x(1+ cos x) has maximum value at x=
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- f(x) = sinx +cos2x (xgt0) has minima at x=
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- The maximum and minimum values of f(x)=4x^(3)+3x^(2)-6x+5 are
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- The function y=2x^3-3x^2-12x+8 has minimum at x=
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- if sqrt(3) sin x + cosx is maximum then x=
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- The function f(x)=sin^2xcos^3x attains a maximum when x =
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- At x=0 f(x) = sinx-x
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- The function which has neither maximum nor minimum at x=0 is
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