Find the value of a,b,c and d from the equation:
`[(a-b,2a +c),(2a-b, 3c+d)]=[(-1,5),(0,13)]`

Find the values of a, b, c and d from the following equation: [(2a+b,a-2b),(5c-d,4c+3d)]=[(4,-3),(11,24)]

The roots of the quadratic equation (a + b-2c)x^2+ (2a-b-c) x + (a-2b + c) = 0 are

There are two possible values of A in the solution of the matrix equation [[2A+1,-5],[-4,A]]^(-1) [[A-5,B],[2A-2,C]]= [[14,D],[E,F]] , where A, B, C, D, E, F are real numbers. The absolute value of the difference of these two solutions, is

In the triangle A B C, a=13, b=14, c=15 then sin (A)/(2)=

If 2 a+3 b+6 c=0, a, b, c in R then the equation a x^(2)+b x+c=0 has a root in

If a , b , c are unequal , what is the condition that value of the following determinant is zero ? Delta=|(a,a^2,a^3+1),(b,b^2,b^3+1),(c,c^2,c^3+1)|

The value of [[a,b,c,d],[-a,b,c,d],[-a,-b,c,d],[-a,-b,-c ,d]] is