Find a basis for and the dimension of the solution space of the homogeneous system of linear equations
−x + y + z = 0
2x ...
find the determinaint of the matrix
0 0 2 0
1 0 0 1
0 -1 3 0
2 1 5 -3
|2x+2|=10
solve using quadratic formula 2y^2-11y+12=0
Solve : $$|t|y'(t)+(t-1)y(t)=t^2$$
|4x-8|=8
2/7 + 6/10
|5x+10|=20
$a^{1/2}$*$a^{1/3}$
(d^2-6d+13)y=0
from higher order ordinary differential equation
