The lengths of the sides of an isosceles...

The lengths of the sides of an isosceles triangle are `9+x^2,9+x^2` and `18-2x^2` units. Calculate the area of the triangle in terms of x and find the value of x which makes the area maximum.

Similar Questions

Explore conceptually related problems

The lengths of the sides of an isosceles triangle are 9+x^(2),9+x^(2) and 18-2x^(2) units Calcule are 9+x^(2),9+x^(2) and 18-2x^(2) units. and find the value of x which makes the area maximum.

If the area of the triangle with vertices x,0,1,1 and 0,2 1, 4 sq units,then the value of x is :

If an isosceles triangle has 2 sides of length 2, then the maximum possible area of the triangle,is

If an isosceles triangle has two sides of length 2,then the maximum possible area of the triangle,is

The sides of a triangle are x,y and z .if x+y=7,y+z=9 and z+x=8. then find the area of the triangle.

The length of the base of an isosceles triangle is 2x - 2y + 4z , and its perimeter is 4x + 6z . Then the length of each of the equal sides is

If the extremities of the base of an isosceles triangle are the points (2a ,0) and (0, a), and the equation of one of the side is x=2a , then the area of the triangle is

The lengths of the sides of an isosceles triangle are `9+x^2,9+x^2` and `18-2x^2` units. Calculate the area of the triangle in terms of x and find the value of x which makes the area maximum.

Similar Questions

Recommended Questions