STATEMENT-1 : `int(dx)/(e^(x)+e^(-x)+2)=-(1)/(e^(x)+1)+c`
and
STATEMENT-2 : `int(d(f(x)))/((f(x))^(2))=-(1)/(f(x))+c`

STATEMENT-1 : int(x^(2)-1)/(x^(2))e^(((x^(2)+1)/(x)))dx=e^((x^(2)+1)/x)+C and STATEMENT-2 : intf'(x)e^(f(x))dx=e^(f(x))+c

int(e^x)/((1+e^x)(2+e^x))dx

STATEMENT-1 : If int(2^(x))/(sqrt(1-4^(x)))=ksin^(-1)(2^(x)) , then k equals (1)/(log2) . STATEMENT-2 : If intf(x)dx=-f(x)+c , then f(log_(e)2)=(1)/(2) STATEMENT-3 : int(e^(x))/(sqrt(1+e^(x)))dx=-2sqrt(1+e^(x))+c

STATEMENT-1 : If int(1)/(f(x))dx=2log|f(x)|+c , then f(x)=(x)/(2) . STATEMENT-2 : When f(x)=(x)/(2) , then int(1)/(f(x))dx=int(2)/(x)dx=2log|x|+c STATEMENT-3 : inte^(x^(2))dx=e^(x^(2))+c

STATEMENT-1 : int_(-2pi)^(5pi)cot^(-1)(tanx)dx=7(pi^(2))/(2) and STATEMENT-2 : int_(a)^(b)f(x)dx=int_(a)^(c )f(x)dx+int_(c )^(b)f(x)dx , a lt c lt b

STATEMENT-1 : int_(0)^(2)[x+[x+[x]]]dx=3 and STATEMENT-2 : int_(a)^(b)f(x)dx=int_(a)^(b)f(a+b-x)dx

STATEMENT-1 : int_(-(pi)/(2))^((pi)/(2))sin(log(x+sqrt(1+x^(2))))dx=0 and STATEMENT-2 : int_(-a)^(a)f(x)dx=0 if f(x) is an even function

If int(dx)/(e^(2x)+e^(-2x))=A/842tan^(- 1)e^(2x)+C then A equals ...

Statement 1: int(xe^(x)dx)/((1+x)^(2))=(e^(x))/(x+1)+C Statement 2: inte^(x)(f(x)+f'(x))dx=e^(x)f(x)+C

int(x+1)/(x(1+x e^x)^2)dx=log|1-f(x)|+f(x)+c , then f(x)=