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प्रश्न
Solve the following pair of simultaneous equations.
`8/x + 5/y = -3, 6/x + 25/y = 2`
योग
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उत्तर
Given equations:
`8/x + 5/y = -3` ...(1)
`6/x + 25/y = 2` ...(2)
Let, `a = 1/x, b = 1/y,`
Then the equations will become:
8a + 5b = −3 ...(1)
6a + 25b = 2 ...(2)
Here, multiplying equation (1) by 5:
5(8a) + 5(5b) = 5(−3)
40a + 25b = −15 ...(3)
Now, subtracting equation (2) from equation (3):
(40a + 25b) − (6a + 25b) = −15 − 2
40a + 25b − 6a − 25b = −17
40a − 6a = −17
34a = −17
a = `(-17)/34`
∴ a = `-1/2`
Let’s substitute `a = -1/2` into equation (1):
`8(-1/2) + 5b = -3`
`(-8)/2 + 5b = -3`
−4 + 5b = −3
5b = − 3 + 4
5b = 1
∴ b = `1/5`
Thus, finding x and y from `a = 1/x, b = 1/y,`
`a = 1/x = -1/2`
∴ x = −2
`b = 1/y = 1/5`
∴ y = 5
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अध्याय 5: Simultaneous Linear Equations - EXERCISE 5A [पृष्ठ ५३]
