mtimes, *
Symbolic matrix multiplication
Syntax
Description
A*BA and B. If A is an
m-by-p and B is a
p-by-n matrix, then the result is an
m-by-n matrix C defined as
For nonscalar A and B, the number of columns
of A must equal the number of rows of B. Matrix
multiplication is not universally commutative for nonscalar inputs. That is, typically
A*B is not equal to B*A. If at least one input is
scalar, then A*B is equivalent to A.*B and is
commutative.
Examples
Multiply Two Vectors
Create a 1-by-5 row vector and
a 5-by-1 column vector.
syms x A = [x, 2*x^2, 3*x^3, 4*x^4] B = [1/x; 2/x^2; 3/x^3; 4/x^4]
A = [ x, 2*x^2, 3*x^3, 4*x^4] B = 1/x 2/x^2 3/x^3 4/x^4
Find the matrix product of these two vectors.
A*B
ans = 30
Multiply Two Matrices
Create a 4-by-3 matrix and a
3-by-2 matrix.
A = sym('a%d%d', [4 3])
B = sym('b%d%d', [3 2])A = [ a11, a12, a13] [ a21, a22, a23] [ a31, a32, a33] [ a41, a42, a43] B = [ b11, b12] [ b21, b22] [ b31, b32]
Multiply A by B.
A*B
ans = [ a11*b11 + a12*b21 + a13*b31, a11*b12 + a12*b22 + a13*b32] [ a21*b11 + a22*b21 + a23*b31, a21*b12 + a22*b22 + a23*b32] [ a31*b11 + a32*b21 + a33*b31, a31*b12 + a32*b22 + a33*b32] [ a41*b11 + a42*b21 + a43*b31, a41*b12 + a42*b22 + a43*b32]
Multiply Matrix by Scalar
Create a 4-by-4 Hilbert matrix
H.
H = sym(hilb(4))
H = [ 1, 1/2, 1/3, 1/4] [ 1/2, 1/3, 1/4, 1/5] [ 1/3, 1/4, 1/5, 1/6] [ 1/4, 1/5, 1/6, 1/7]
Multiply H by
eπ.
C = H*exp(sym(pi))
C = [ exp(pi), exp(pi)/2, exp(pi)/3, exp(pi)/4] [ exp(pi)/2, exp(pi)/3, exp(pi)/4, exp(pi)/5] [ exp(pi)/3, exp(pi)/4, exp(pi)/5, exp(pi)/6] [ exp(pi)/4, exp(pi)/5, exp(pi)/6, exp(pi)/7]
Use vpa and digits to approximate symbolic
results with the required number of digits. For example, approximate it with five-digit
accuracy.
old = digits(5); vpa(C) digits(old)
ans = [ 23.141, 11.57, 7.7136, 5.7852] [ 11.57, 7.7136, 5.7852, 4.6281] [ 7.7136, 5.7852, 4.6281, 3.8568] [ 5.7852, 4.6281, 3.8568, 3.3058]
