" The value of the integral "int(-4)^(4)...

" The value of the integral "int_(-4)^(4)|x-3|dx" is "

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The value of the integral int_(-4)^(4)e^(|x|){x}dx is equal to (where {.} denotes the fractional part function)

The value of the integral int_(-4)^(4)e^(|x|){x}dx is equal to (where {.} denotes the fractional part function)

If the value of the integral int_(1)^(2)e^(x^(2))dx is alpha, then the value of int_(e)^(e^(4))sqrt(ln x)dx is:

The value of the integral int _0^oo 1/(1+x^4)dx is

The value of integral int_(-2)^(4) x[x]dx is

The value of integral int_(-2)^(4) x[x]dx is

If f(x) is continuous and int_(0)^(9)f(x)dx=4 , then the value of the integral int_(0)^(3)x.f(x^(2))dx is

If f(x) is continuous and int_(0)^(9)f(x)dx=4 , then the value of the integral int_(0)^(3)x.f(x^(2))dx is

If f(x) is continuous and int_(0)^(9)f(x)dx=4 , then the value of the integral int_(0)^(3)x.f(x^(2))dx is

If f(x) is continuous and int_(0)^(9)f(x)dx=4 , then the value of the integral int_(0)^(3)x.f(x^(2))dx is

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