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Question
Solve the following pair of linear equations:
`8/x + 1/y = 3, 16/x - 3/y = 1, x ≠ 0, y ≠ 0`
Sum
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Solution
Given:
`8/x + 1/y = 3, 16/x - 3/y = 1, x ≠ 0, y ≠ 0`
Step-wise calculation:
1. Put `(1/x = u)` and `(1/y = v)`.
Then the system becomes:
8u + v = 3 ...(1)
16u – 3v = 1 ...(2)
2. Multiply equation (1) by 3 to align the coefficients of (v):
3 × (8u + v) = 3 × 3
⇒ 24u + 3v = 9 ...(3)
3. Add equations (2) and (3):
(16u – 3v) + (24u + 3v) = 1 + 9
`40u = 10u`
`40u = 10/40`
`40u = 1/4`
4. Substitute `(u = 1/4)` into equation (1):
`8 xx 1/4 + v = 3`
`8 xx 1/4 + v = 2 + v`
`8 xx 1/4 + v = 3v`
`8 xx 1/4 + v = 1`
5. Recall `(u = 1/x)` and `(v = 1/y)`:
`1/x = 1/4`
⇒ `x = 4 1/y`
⇒ x = 1
⇒ y = 1
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