How do you find the inverse of #A=##((18, -3), (-3, 15))#? Precalculus Matrix Algebra Inverse Matrix 1 Answer Konstantinos Michailidis Feb 21, 2016 To find the inverse #A^-1#of a matrix #A# which is #2x2# the formula is #[((a, b), (c, d))]^(-1)=1/[a*d-b*c]*[((d, -b), (-c, a))]# Just replace for #a=18,b=-3,c=-3,d=15# to get #A^-1=1/87*((5,1),(1,6))# Answer link Related questions What is the multiplicative inverse of a matrix? How do I use an inverse matrix to solve a system of equations? How do I find an inverse matrix on a TI-84 Plus? How do I find the inverse of a #2xx2# matrix? How do I find the inverse of a #3xx3# matrix? How do I find an inverse matrix on an Nspire? What is the meaning of the phrase invertible matrix? The given matrix is invertible ? first row ( -1 0 0 ) second row ( 0 2 0 ) third row ( 0 0 1/3 ) How do you find the inverse of #A=##((2, 4, 1),(-1, 1, -1), (1, 4, 0))#? How do you find the inverse of #A=##((1, 1, 1, 0), (1, 1, 0, -1), (0, 1, 0, 1), (0, 1, 1, 0))#? See all questions in Inverse Matrix Impact of this question 2592 views around the world You can reuse this answer Creative Commons License