Integration By Substitution
∫-15x4(-3x5-1)5dx
1/6(-3x5-1)6+C
∫xexdx
xex-ex+C
∫5/(2x2-3x-2)dx
-ln|2x+1|+ln|x-2|+C
∫1/(x2√(9-x2))dx
-1/9(√(9-x2))+C
An advanced mathematical science that speaks a single universal language
What is Calculus?
∫x2(1+2x3)2dx
1/18(1+2x3)3+C
∫(lnx)(x6)dx
1/7(lnx)x7-1/49x7+C
∫(10x-2x2)/(x-1)2(x+3)dx
ln|x-1|-2/(x-1)-3ln|x+3|+C
∫1/(16+x2)3/2dx
1/16(x/√(16+x2))+C
Differential and Integral
What are the two main branches of Calculus?
∫sin6(5x)cos(5x)dx
1/35(sin5x)7+C
∫x2sin(4x)dx
-1/4(x2)cos4x+1/8(x)sin4x+1/32cos4x+C
∫2x2-x-1/(x2+1)(x-2)dx
1/2ln|x2+1|+arctanx+ln|x-2|+C
∫(√(x2-16)/x)+C
4(√(x2-16)/4)-4(sec-1(x/4))+C
One of the uses of differential calculus is describing how steeply a curve is rising or falling. This is measured by a straight line which touches the curve at exactly one point
What is the Tangent line?
∫x3√(x4+5)dx
1/6(x4+5)3/2+C
∫cos2xdx
(cosxsinx+x)/2+C
∫(x3-7x2+10x+1/x2-7x+10)dx
(x2/2)-1/3ln|x-2|+1/3ln|x-5|+C
∫3/√(2x-2)dx
3arcsin(x-1)+C
A scientist and mathematician that was one of several to develop a method, still used in introductory calculus classes, for obtaining the derivative of a curve from first principles
Who is Issac Newton?
∫(x+7)∛(3-2x)dx
-1/4(51/4(3-2x)4/3-3/7(3-2x)7/3)+C
∫e2xsin(3x)dx
1/13e2x(2sin(3x)-3cos(3x))+c
∫(x4+3x3+2x2+1/x2+3x+2)dx
x3/3+ln|x+1|-ln|x+2|+C
∫(x-1/√(2x-x2))dx
((x+x2−3)√(2x−x2))/3+C
A special case of the Mean Value Theorem
What is Rolle's Theorem