AB is a diameter of a circle and C is any point on the circumference of the circle. Then the area of ` A B C` is maximum when it is isosceles the area of ` A B C` is minimum when it is isosceles the perimeter of ` A B C` is minimum when it is isosceles none of these

AB is a diameter of a circle and C is any point on the circumference of the circle.Then (a) the area of Delta ABC is maximum when it is isosceles (b) the area of Delta ABC is minimum when it is isosceles (c) the perimeter of Delta ABC is minimum when it is isosceles (d) none of these

AB is a diameter of a circle and C is any point on the circle.Show that the area of ABC is maximum,when it is isosceles.

If the area of a circle is A, radius of the circle is r and circumference of it is C, then

If the area of a circle is A, radius of the circle is r and circumference of it is C, then

If a chord AB of a circle subtends an angle theta(nepi//3) at a point C on the circumference such that the triangle ABC has maximum area , then

If A is the area and C is the circumference of a circle,then its radius is (A)/(C)( b) (2A)/(C)(3A)/(C) (d) (4A)/(C)

The sum of perimeter of a square and circumference of a circle is given. Prove that the sum of their areas will be minimum when the side of square is equal to the diameter of the circle.

The edges of the diameter of circles are A & B whose centre is P. A point C is on the circumference of the circle such that angleABC=35^(@) then find anglePCA .

Prove that the area of right-angled triangle of given hypotenuse is maximum when the triangle is isosceles.

Prove that the perimeter of a right-angled triangle of given hypotenuse is maximum when the triangle is isosceles