☑️It
Differential Equations (Clontz)
Bank Home
C1 - Homogeneous first-order linear IVP
C2 - Non-homogeneous first-order linear ODE
C3 - Homogeneous second-order linear ODE
C4 - Homogeneous second-order linear IVP
C5 - Non-homogeneous second-order linear ODE
D1 - Discontinuous functions and distributions
D2 - Laplace transforms from formula and definition
D3 - Inverse Laplace transforms
D4 - Using Laplace transforms to solve IVPs
F1 - Direction fields for first-order ODEs
F2 - Separation of variables
F3 - Techniques for linear IVPs
F4 - Implicit solutions for exact IVPs
F5 - Substitution strategies
X1 - Linear ODE systems
X2 - Existence/uniqueness theorem for linear IVPs
X3 - Existence/uniqueness theorem for first-order IVPs
Linear Algebra for Team-Based Inquiry Learning
Bank Home
E1 - Linear systems, vector equations, and augmented matrices
E2 - Reduced row echelon form
E3 - Solving linear systems
V1 - Vector spaces
V2 - Linear combinations
V3 - Spanning sets
V4 - Subspaces
V5 - Linear independence
V6 - Basis identification
V7 - Basis of a subspace
V8 - Polynomial and matrix spaces
V9 - Homogeneous systems
A1 - Linear maps
A2 - Standard matrices
A3 - Image and kernel
A4 - Injectivity and surjectivity
M1 - Multiplying matrices
M2 - Row operations as matrix multiplication
M3 - Invertible matrices
M4 - Finding a matrix inverse
G1 - Row operations and determinants
G2 - Determinants
G3 - Eigenvalues
G4 - Eigenvectors
Differential Equations (Clontz)
Choose an objective below for example exercises.
C1 - Homogeneous first-order linear IVP
C2 - Non-homogeneous first-order linear ODE
C3 - Homogeneous second-order linear ODE
C4 - Homogeneous second-order linear IVP
C5 - Non-homogeneous second-order linear ODE
D1 - Discontinuous functions and distributions
D2 - Laplace transforms from formula and definition
D3 - Inverse Laplace transforms
D4 - Using Laplace transforms to solve IVPs
F1 - Direction fields for first-order ODEs
F2 - Separation of variables
F3 - Techniques for linear IVPs
F4 - Implicit solutions for exact IVPs
F5 - Substitution strategies
X1 - Linear ODE systems
X2 - Existence/uniqueness theorem for linear IVPs
X3 - Existence/uniqueness theorem for first-order IVPs