A right triangle has perimeter 144 cm and hypotenuse 65 cm find its base and height. Also find its area using heron's formula
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Hint
The legs of the triangle, say $a,b,$ satisfy:
- $a+b=144-65$ (perimeter)
- $a^2+b^2=65^2$ (Pythagoras theorem)
Solve the system and you will get $a$ and $b.$
Then, since you know $a,b$ and the hypotenuse, just substutite in the Heron's formula.
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Given : Hypotenuse H=65 , Perimeter P=144 , therefore sum of Base B and Adjacent A is 144-65=79. Hence, we have following equations , A + B = 79 and A$^2$+ B$^2$ = 65$^2$. Substitute these in the equation (A + B)$^2$ = A$^2$ + B$^2$ + 2AB , ie , 79$^2$ = 65$^2$ + 2AB giving AB = 1008 . This implies A is 1008/B and substituting this in the eqn A+B=79 yields a quadratic equation, B$^2$ - 79B + 1008 = 0 . Solving this quadratic eqn gives B = 63 or 16. Say B=63 then A=16 . Now, substituting this in Heron's formula gives the Area = 504