The parallelogram is bounded by the line...

The parallelogram is bounded by the lines `y=ax + c; y=ax + d; y=bx + c` and `y=bx+ d ` and has the area `18` the parallelogram bounded by the lines `y=ax+c,y=ax-d,y=bx+c` and `y=bx-d` has area `72` given that `a,b,c&d` are positive numbers find the smallest possible value of `(a+b+c+d)`

Similar Questions

Explore conceptually related problems

If a+b+c=0 and pne 0 then lines ax + (b+ c)y =p, bx+ (c+a)y=p and cx+ (a+b) y=p

If y=ax^(2)+bx+c is the reflection of parabola y=x^(2)-4x+1 about the line y=3,a+b+c=

The the area bounded by the curve |x| + |y| = c (c > 0) is 2c^(2) , then the area bounded by |ax + by| + |bx - ay| = c where b^(2) - a^(2) = 1 is

The vertex or the parabola y = ax^(2)+bx+c is

If a+b+c=0 and p!=0, the lines ax+(b+c)y=p,bx+(c+a)y=p and cx(a+b)y=p