Triangle `O A B` is isosceles right triangle right angled at `OdotO` is origin and equation of `A B` is `2x+3y=6` then area of triangle `O A B` is `(36)/(13)` b. `(12)/(17)` c. `(13)/5` d. `(17)/(13)`

Triangle OAB is isosceles right triangle right angled at O.O is origin and equation of AB is 2x+3y=6 then area of triangle OAB is (36)/(13) b.(12)/(17) c.(13)/(5) d.(17)/(13)

A B C is an isosceles right triangle right-angled at C . Prove that A B^2=2A C^2 .

ABC is an isosceles right triangle, right-angled at C . Prove that: A B^2=2A C^2dot

If a pair of perpendicular straight lines drawn through the origin forms an isosceles triangle with the line 2x+3y=6, then area of the triangle so formed is (a) (36)/(13) (b) (12)/(17) (c) (c) (13)/(5) (d) (17)/(14)

Let triangleABC is a right angled triangle right angled at A such that A(1,2),C(3,1) and area of triangleABC=5sqrt(5) then abscissa of B can be

If a pair of perpendicular straight lines drawn through the origin forms an isosceles triangle with the line 2x+3y=6 , then area of the triangle so formed is (a) 36/13 (b) 12/17 (c) 13/5 (d) 17/14

If a pair of perpendicular straight lines drawn through the origin forms an isosceles triangle with the line 2x+3y=6 , then area of the triangle so formed is (a) 36/13 (b) 12/17 (c) 13/5 (d) 17/14

ABC is a right angle triangle right angled at C. If AC =3 and AB:BC = 13:5, then find sinA and tanB.

In a right triangle A B C , right angled at C , if /_B=60o and A B=15 units. Find the remaining angles and sides.

If a pair of perpendicular straight lines drawn through the origin forms an isosceles triangle with the line 2x+3y=6 , then area of the triangle so formed is 36/13 (b) 12/17 (c) 13/5 (d) 17/14