How to find the eigenvalues and normalised eigenvectors of a matrix
- Solve the characteristic equation for A
- Solutions are the eigenvalues
- The eigenvector corresponding to the eigenvalue has to satisfy (A-λI)x(v) = 0
(v) is the vector
Fourier series for a square wave
- Fourier series expansion formula
- Find the coefficients
- odd -> cos is odd -> an = 0
- even -> sin is even -> bn = 0
Indirect calculation of Laplace transform
- Apply Laplace transform table
Inverse Laplace transform using partial fractions
- use partial fractions
- use table to solve
solution of ODE with constant coefficients using the Laplace transform
- Take the Laplace transform
- Substitute in the boundary conditions and rearrange
- Use partial fractions
- use table to solve
How to calculate the unit vector
a(v)(h) = a(v)/a
where a(v)(h) is the unit vector
and a = √(a(x)^2+a(y)^2)
how to calculate the projection of b onto the vector a
- the component of b that is in the direction of a
- evaluate the dot product a(hat) . b
what is the normal to the plane
- solve | r(v) . n(v)(h) | = d
where n(v) is the coefficients of the equation.
and r(v) = (x,y,z)
what is the shortest distance from plane
- | r(v) . n(v)(h) | = d
- rewriting for the point |{(P(v)-r(v)} . n(v) |
derivation of a formula for the shortest distance between two lines
- r(v) = r0(v) + λ a(v)
- q(v) = q0(v) + λ b(v)
- n(v)(h) = {a(v) x b(v)} / {|a(v) x b(v) |}
- d = |(r0(v) - q0(v)) . n(v)(h) |
find an expression for the angular momentum J(v) = r(v) x p(v) rotating with angular velocity ω(v)
J(v) = r(v) x p(v) = m r(v) x v(v)
= m r(v) x {ω(v) x r(v)}
= mr^2 ω(v) - m(r(v) . ω(v)) r(v)
=> J(v) = I ω(v)
Differentiating a vector
- take the derivative of each component
Using the gradient find the location of a scalar functions minimum
- Take the gradient
- each vector component = 0
- solve for each component (x,y,z)
the scalar potential φ = x^2 + y^2 + z^2 can be written in cylindrical and polar coordinates as
cylindrical = φ = p^2 + z^2
polar = r^2
express the position vector in terms of the unit vectors of cylindrical coordinates
- equate r(v) = r(v) cylindrical
- solve for cylindrical unit vectors
express the cartesian coordinate in terms of the unit vectors of cylindrical coordinates
- find p = √(x^2+y^2)
- find azimuthal angle φ = arctan(y/x)
- substitute into r =p e(h)(p) + ze(h)(z)
express the vector field into terms of the unit vectors of cylindrical coordinates
- compare vector field to cylindrical vector field
- vector field = cylindrical vector field
- compare cylindrical vector field to r =p e(h)(p) + ze(h)(z)
express the cartesian vector in terms of cylindrical polar variables p, φ and z
- compare to vector to cylindrical r(v)
- r = p e(h)(p) + ze(h)(z)
take a cartesian vector and express it in terms of the unit vectors of cylindrical polar coordinates
p = √(x^2+y^2)
φ = arctan(y/x)
Calculate the divergence of the position vector r in cartesian and spherical polar coordinates
- Cartesian - divergence formula ∇ . r(v)
- Spherical r(v) = r e(h)(r)
- divergence formula ∇ . r(v)
work out the total surface area of a cylinder of length L and radius R
- A = curved surface + top + bottom
- top and bottom are the same
- curved surface + 2top
- (L ∫0)(2π ∫0) p dφ dz + 2 (R ∫ 0)(2π ∫ 0) pdpdφ
calculate the surface area of a sphere of radius R
- (2π ∫ 0)(π ∫ 0) R^2 sinθ dθ dφ
a string lies along the curve r(v) how long is the length of string between two points
- take derivative dr(v)/du
- ds = |dr(v)/du | du
- L = ( B ∫ A) ds
evaluate f(x,y) over the path r(v)
- find the norm ds = |dr(v)/du | du
- parameterise f(x,y) using r(x,y)
- ( ∫ C) f(x,y) ds
