Consider the following general matroc equation: [a1​a2​​]=[m11​m12​m21​m22​​][x1​x2​​] which can also be abbreviated as: A=MX By definition, the determinant of M is given by det(M)=m11​m22​−m12​m21​ The following questions are about the retationship between the determinant of M and the abaty to solve the equation above for A in terms of X of for X in terms of A. Check the boxes which make the statement correct: If the det(M)=0 then A. some values of X will have no values of A which satisfy the equation. B. some values of A will have no values of X Which will satisfy the equation c. some values of A (such as A=0 ) will allow more than one X to satisfy the equation D. given any X there is one and only one A which will satisfy the equation. E. given any A there is one and onty one X which will satisty the equation. F, some vakius of X will have more than one value of A which satisfy the equation. Check the boxes which make the stalement correct: If the det (M)=0 then A. given any A there is one and only one X which will satisfy the equation. B. some values of A (such as A=0 ) wit andow more than one X to satisfy the equation. C. some values of A will have no values of X which wall satisfy the equation. D. there is no value of X which satisfies the equation when A=0 E. given any X there is one and only one A which will satisfy the equation. Check the conditions that guarantee that det(M)=0 : A. When A=0 there is more than one X which satisfies the equation B. Given any X there is one and only one A which will satisty the equation. c. There is some value of A for waich no value of X satisfies the equation. D. Given any A the is one and only one X which will satisfy the equation.