The total number of distinct x in (0,1]...

The total number of distinct `x in (0,1]` for which `int_(0)^(x)(t^(2))/(1+t^(4)) dt = 2x-1` is

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The total number for distinct x epsilon[0,1] for which int_(0)^(x)(t^(2))/(1+t^(4))dt=2x-1 is __________.

The total number for distinct x epsilon[0,1] for which int_(0)^(x)(t^(2))/(1+t^(4))dt=2x-1 is __________.

The total number for distinct x epsilon[0,1] for which int_(0)^(x)(t^(2))/(1+t^(4))dt=2x-1 is __________.

Total number of distinct x epsilon [0,1] for which int_(0)^(x) (t^(8)+1)/(t^(8)+t^(2)+1) dt=3x-2 is ______

Let f(x)=int_(1)^(x)(3^(t))/(1+t^(2))dt , where xgt0 , Then

Let f(x)=int_(1)^(x)(3^(t))/(1+t^(2))dt , where xgt0 , Then

Let f(x)=int_(1)^(x)(3^(t))/(1+t^(2))dt , where xgt0 , Then

Let f(x)=int_(1)^(x)(3^(t))/(1+t^(2))dt , where xgt0 , Then

If y = int_(0)^(x) (t^(2))/(sqrt(t^(2)+1))dt then (dy)/(dx) at x=1 is

The number of critical points of the function f(x)=int_(0)^(x)e^(t)(t-1)(t-2)(t-3)dt

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