The derivative of an odd function is alw...

The derivative of an odd function is always

an odd function

an even function

does not exist

none of these

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True or False : Derivative of an even function is always an odd function.

Left hand derivative and right hand derivative of a function f(x) at a point x=a are defined as f'(a^-)=lim_(hrarr0^(+))(f(a)-f(a-h))/(h) =lim_(hrarr0^(+))(f(a+h)-f(a))/(h) andf'(a^(+))=lim_(hrarr0^(+))(f(a+h)-f(a))/(h) =lim_(hrarr0^(+))(f(a)-f(a+h))/(h) =lim_(hrarr0^(+)) (f(a)-f(x))/(a-x) respectively. Let f be a twice differentiable function. We also know that derivative of a even function is odd function and derivative of an odd function is even function. If f is even function, which of the following is right hand derivative of f' at x=a?

Find the derivative of the following functions sin x cos x

Find the derivatives of the following functions at any point of their domains: sec(tansqrtx)

Find the derivatives of the following functions at any point of their domains: log |sin x|

Find the derivatives of the following functions at any point of their domains: cosx^2

Find the derivatives of the following functions at any point of their domains: cos(logx)

Statement I Integral of an even function is not always an odd function. Statement II Integral of an odd function is an even function .

Find the derivatives of the following function : f (x) =x+a.

OMEGA PUBLICATION-LIMITS AND DERIVATIVES-MULTIPLE CHOICE QUESTION

underset(x rarr infty)limsqrt(x^(2)-1)/(2x+1) is equal to
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If underset(x rarr 0) lim (sin px)/(tan 3x) = 4, then the value of p i...
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The derivative of an odd function is always
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The rate of change of the volume of a sphere w.r.t. its surface area, ...
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If f(x)=x^(2) , then f'(2) is
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The derivative of f(x) =|x | at x=0 is
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If f(x)=2x-5, then f(1) is
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Derivative of x^(6) + 6^(x) w.r.t. 'x' is
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The derivative of sin x cos x w.r.t. x is
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If x= a(theta+sin theta), y=a(1-cos theta), then (dy)/(dx)=
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[d/dx(sin^-1 x + cos^-1 x)]
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If y=sqrt(sinx+sqrt(sinx+sqrt(sinx+...oo,))) where sinxgt0, then find ...
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underset(theta rarr 0) lim (sin theta)/(theta) =
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underset(theta rarr 0)lim(sin 5theta)/(theta) is
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underset(theta rarr 0)lim (tan theta)/(theta)
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For a gt 0 underset(x rarr a)lim(x^(n)-a^(n))/(x-a) =
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(d)/(dx)(aa^(x))=?( a gt 0, a ne 1)
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(d)/(dx)(sec x) =
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(d)/(dx)(2)^x = ?
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(d)/(dx)(log(a)x)= ? (for agt0, a ne 1)
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