All ACT Math Resources
Example Questions
Example Question #1 : Matrices
Simplify the following
When multplying any matrix by a scalar quantity (3 in our case), we simply multiply each term in the matrix by the scalar.
Therefore, every number simply gets multiplied by 3, giving us our answer.
Example Question #5 : Scalar Interactions With Matrices
Define matrix , and let be the 3x3 identity matrix.
If , then evaluate .
The 3x3 identity matrix is
Both scalar multplication of a matrix and matrix addition are performed elementwise, so
is the first element in the third row of , which is 3; similarly, . Therefore,
Example Question #4 : Matrices
Define matrix , and let be the 3x3 identity matrix.
If , then evaluate .
The 3x3 identity matrix is
Both scalar multplication of a matrix and matrix addition are performed elementwise, so
is the first element in the third row of , which is 3; similarly, . Therefore,
Example Question #5 : Matrices
Define matrix .
If , evaluate .
The correct answer is not among the other responses.
If , then .
Scalar multplication of a matrix is done elementwise, so
is the first element in the second row of , which is 5, so
Example Question #2 : Matrices
Define matrix .
If , evaluate .
The correct answer is not among the other responses.
Scalar multplication of a matrix is done elementwise, so
is the third element in the second row of , which is 1, so
Example Question #1 : Matrices
Define matrix , and let be the 3x3 identity matrix.
If , evaluate .
The correct answer is not given among the other responses.
The 3x3 identity matrix is
Both scalar multplication of a matrix and matrix addition are performed elementwise, so
is the first element in the second row, which is 5; similarly, . The equation becomes
Example Question #1 : How To Multiply A Matrix By A Scalar
Define matrix , and let be the 3x3 identity matrix.
If , evaluate .
The correct answer is not given among the other responses.
The 3x3 identity matrix is
Both scalar multplication of a matrix and matrix addition are performed elementwise, so
is the second element in the second row, which is 6; similarly, . The equation becomes
Example Question #1 : How To Multiply A Matrix By A Scalar
When multiplying a constant to a matrix, multiply each entry in the matrix by the constant.