Antiderivatives

∫dx

x + c

∫x^pdx

(x^p+1/(p + 1)) + c

∫kdx

kx + c

∫a^xdx

a^x/ln(a) + c

∫1/x dx

ln|x| + c

∫e^xdx

e^x

∫sin(x)dx

-cos(x) + c

∫cos(x)dx

sin(x) + c

∫sec²(x)dx

tan(x) + c

∫tan(x)dx

-ln|cos(x)| + c

∫csc(x)dx

-ln|csc(x) + cot(x)| + C

∫sec(x)dx

-ln|sec(x) + tan(x)| + c

∫cot(x)dx

ln|sin(x)| + c

∫sec(x)tan(x)dx

sec(x) + c

∫csc(x)cot(x)dx

-csc(x) + c

∫csc²dx

-cot(x) + c

∫1/x²+1 dx

arctan(x) + c

∫1/√1-x² dx

arcsin(x) + c

∫1/x√x²+1 dx

arcsec|x| + c