Calc 2 Exam 1 Review - Key Formulas
∫uⁿdu
(uⁿ⁺¹)/(n+1) +C
Integrate ∫sin^mx cosⁿxdx when n is odd and positive
-convert all but one factor of the cosine to sine using cos²x=1-sin²x -expand and integrate
Integrate ∫sin^mx cosⁿxdx when m is odd and positive
-convert all but one factor of the sine to cosine using sin²x=1-cos²x -expand and integrate
Integrate ∫sec^mxtanⁿxdx if there are no secant factors and n is even and positive
-convert one tangent square factor by tan²x=sec²x-1 -expand and repeat if necessary. eventually it will be able to be integrated
Steps for partial fraction decomposition
-divide the rational expression using polynomial long division if it is improper -factor the denominator completely -write the general form of the partial fraction decomposition -multiply both sides of the general form by the LCD the resulting equation is called the basic equation -solve the basic equation for the unknown constants. this can be done by substitution or by coefficient equations
Steps for partial fraction decomposition if a function is improper
-it must be rewritten using polynomial long division and the division algorithm: dividend/divisor = quotient + remainder/divisor -result will be a polynomial and a proper fraction that can be decomposed
Integrate ∫sin^mx cosⁿxdx when both m and n are even
-reduce the powers using the power reduction rules. this may need to be used several times
Integrate ∫sec^mxtanⁿxdx when n is odd and positive
-save a secxtanx factor and convert the rest of the factors to secants using tan²x=sec²x-1 -expand and integrate
Integrate ∫sec^mxtanⁿxdx when m is even and positive
-save a sec²x factor and convert the rest of the factors to tangents using sec²x=1+tan²x -expand and integrate
Integrate ∫sec^mxtanⁿxdx when there are no tangent factors and m is odd and positive
-use integration by parts where u=secx and dv=sec^m-1 x
∫sinudu=
=-cosu+C
∫tanudu=
=-ln|cosu|+C
∫cscudu=
=-ln|cscu-cotu|+C
∫secudu=
=ln|secu+tanu|+C
∫cotudu=
=ln|sinu|+C
∫cosudu=
=sinu+C
Distance between a point (x₁,y₁,z₁) and a plane:
D=|ax₁+by₁+cz₁+d|/√a²+b²+c²
Fluid force
F=w∫h(y)L(y)dy
Torque vector
T=rxF
Trapezoid Rule
TRAPn=∆x/2[f(x₀) + 2f(x₁) + 2f(x₂) +...+ 2f(n-1) +f(xn))
Shell method equation (about y axis)
V=2π∫r(x)h(x)dx
Shell method equation (about x axis)
V=2π∫r(y)h(y)dy
Washer method equation (about x axis)
V=π∫[(f(x))² - (g(x))²]dx
Washer method equation (about y axis)
V=π∫[(f(y))² - (g(y))²]dy
Disk method equation (about x axis)
V=π∫[f(x)]²dx
Disk method equation (about y axis)
V=π∫[f(y)]²dy
Volumes by cross section equation
V=∫A(x)dx
Definition of the displacement vector in physics
W=(|F|cosθ)|D| = |F||D|cosθ = F.D
Work formula
W=∫F(x)dx
Work of a varying force and distance (emptying tanks, hauling chains, etc.)
W=∫f(y)h(y)dy
Hooke's law for springs
W=∫kxdx
Scalar equation of the plane through point (x₀,y₀,z₀) and orthagonal to vector n
a(x-x₀) +b(y-y₀)+c(z-z₀)=0
Dot product of two vectors in 2D
a.b = a₁b₁+a₂b₂
Dot product of two vectors in 3D
a.b =a₁b₁+a₂b₂+a₃b₃
How to calculate the angle between vectors a and b
a.b =|a||b|cosθ
Component form of a vector in 3D
a= <x₂-x₁, y₂-y₁, z₂-z₁>
Component form of a vector in 2D
a= <x₂-x₁, y₂-y₁>
General form of a plane
ax+by+cz+d=0
Cross product (vector product)
axb = <a₂b₃-a₃b₂, a₃b₁-a₁b₃, a₁b₂-a₂b₁> -determinants of matrices multiplied by minor of each element
Scalar projection (component of b along a)
compab = |projab| = (|b|(a.b))/|a||b| = (a.b)/|a|
∫e^u du
e^u +C
Integration by parts for ∫kx√mx+b dx
let u=kx and dv=√mx+b dx. however, this is more easily done by a u-substitution where u = mx+b
Integration by parts for ∫xⁿlnxdx
let u=lnx and dv=xⁿdx. Simplify ∫vdu before integrating. Tabular method ineffective here.
Integration by parts for ∫e^kxsin(mx)dx
let u=sin(mx) and dv=e^kxdx. integrate twice, then collect like terms and solve algebraically
Integration by parts for ∫xⁿsin(kx)dx
let u=xⁿ and dv=sin(kx). works for cos(kx) as well. tabular method works well for power reduction
Integration by parts for ∫xⁿe^kx dx
let u=xⁿ and let dv=e^kxdx. Tabular method works well for power reduction
∫du/u or ∫(1/u)du
ln|u| +C
Vector equations of a plane
n.(r-r₀)=0 or n.r=n.r₀
Equation for a line segment from r₀ to r₁
r(t) = (1-t)r₀ +tr₁ where 0≤t≤1
Arc length formula
s=∫√1+[f'(x)]²dx
Power reduction rules
sin²x= (1-cos(2x))/2 cos²x=(1+cos(2x))/2
Pythagorean Identity
sin²x=1-cos²x cos²x=1-sin²x sec²x=1+tan²x tan²x=sec²x-1
Symmetric equations
x-x₀/a = y-y₀/b = z-z₀/c
Magnitude of torque vector
|T|=|r||F|sinθ
Scalar triple product of three vectors
|a.(bxc)|
Magnitude of the cross product
|axb| =|a||b|sinθ
Magnitude of a vector in 2D
|a|=√a₁²+a₂²
Magnitude of a vector in 3D
|a|=√a₁²+a₂²+a₃²
Length of a vector projection (here, of b onto a)
|projab|=|b|cosθ
Reference angle for a vector
θ=tan⁻¹|y/x|
MRAMn=
∑(f(xk-1)+f(xk))/2 ∆x
RRAMn=
∑f(xk)∆x
LRAMn=
∑f(xk-1)∆x
Area between curves equation
∫f(x)dx - ∫g(x)dx = ∫[f(x)-g(x)]dx
Simpson's Method
∫f(x)dx = ∆x/3[f(x₀) + 4f(x₁)+ 2f(x₂) + 4f(x₃) +...+ 2f(xn-2)+ 4f(xn-1) +f(xn)]
Integration by Parts
∫udv = uv - ∫vdu
