" The integral "int(-1/2)^(1/2)([x]+ell ...

" The integral "int_(-1/2)^(1/2)([x]+ell n((1+x)/(1-x)))dx" is equal to "([x]" is the greatest integer "<=x)

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The integral int_(-1//2)^(1//2) ([x] + l_n ((1 + x)/(1 - x)))dx equals :

The integral int_( -1//2)^(1//2) {[x]+ in ((1+x)/(1-x))} dx equals

The integral int_(-1/2)^(1/2) ([x]+1n((1+x)/(1-x)))dx is equal to (where [.] represents the greatest integer function)

The integral int_(-1/2)^(1/2) ([x]+1n((1+x)/(1-x)))dx is equal to (where [.] represents the greatest integer function)

The integral int_(-1/2)^(1/2) ([x]+1n((1+x)/(1-x)))dx is equal to (where [.] represents the greatest integer function)

The integral int_(-1/2)^(1/2) ([x]+1n((1+x)/(1-x)))dx is equal to (where [.] represents the greatest integer function) -1/2 (b) 0 (c) 1 (c) 21n(1/2)

The integral int_(-1/2)^(1/2) ([x]+1n((1+x)/(1-x)))dx is equal to (where [.] represents the greatest integer function) -1/2 (b) 0 (c) 1 (c) 21n(1/2)

The integral int_(-(1)/(2))^((1)/(2))([x]+log((1+x)/(1-x)))*dx equals

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