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प्रश्न
Solve the following systems of equations:
`2/x + 5/y = 1`
`60/x + 40/y = 19, x = ! 0, y != 0`
उत्तर
Taking 1/x = u and 1/y = v the given become
2u + 5v = 1 ......(1)
60u + 40u = 19 .....(ii)
Let us eliminate ‘u’ from equation (i) and (ii), multiplying equation (i) by 60 and equation (ii) by 2, we get
120u + 300v = 60 ....(iii)
120u + 80v = 38 ....(iv)
Subtracting (iv) from (iii), we get
300v - 80v = 60 - 38
=> 220v = 22
=> `v = 22/220 = 1/10`
Putting `v = 1/10` in equation (i) we get
`2u + 5 xx 1/10 = 1`
`=> 2u + 1/2 = 1`
`=> 2u = 1 - 1/2`
`=> 2u = (2-1)/2 = 1/2`
`=> 2u = 1/2`
`=> u = 1/4`
hence `x = 1/u = 4` and `y = 1/v = 10`
So, the solution of the given system of equation is x = 4, y = 10
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