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प्रश्न
The length of the hypotenuse of a right-angled triangle exceeds the length of the base by 2 cm and exceeds twice the length of the altitude by 1 cm. Find the length of each side of the triangle.
उत्तर
Let the base and altitude of the right-angled triangle be x and y cm, respectively Therefore, the hypotenuse will be `(x + 2) cm`.
∴ `(x+2)^2=y^2+x^2` ...............(1)
Again, the hypotenuse exceeds twice the length of the altitude by 1 cm.
∴`h=(2y+1)`
⇒`x+2=2y+1`
⇒` x=2y-1`
Putting the value of x in (1), we get:
`(2y-1+2)^2=y^2+(2y-1)^2`
⇒` (2y+1)^2=y^2+4y^2-4y+1`
⇒` 4y^2+4y+1=5y^2-4y+1`
⇒`-y^2+8y=0`
⇒`y^2-8y=0`
⇒`y(y-8)=0`
⇒`y=8 cm`
∴ `x=16-1=15 cm`
∴` h=16+1=17 cm`
Thus, the base, altitude and hypotenuse of the triangle are 15 cm, 8 cm and 17 cm, respectively.
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