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प्रश्न
Find the values of a and b for which `x = 3/4` and x = –2 are the roots of the equation ax2 + bx – 6 = 0.
योग
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उत्तर
It is given that `3/4` is a root of ax2 + bx – 6 = 0; therefore, we have:
`a xx (3/4)^2 + b xx 3/4 - 6 = 0`
⇒ `(9a)/16 + (3b)/4 = 6`
⇒ `(9a + 12b)/16 = 6`
⇒ 9a + 12b – 96 = 0
⇒ 3a + 4b = 32 ...(i)
Again, (–2) is a root of ax2 + bx – 6 = 0; therefore, we have:
a × (–2)2 + b × (–2) – 6 = 0
⇒ 4a – 2b = 6
⇒ 2a – b = 3 ...(ii)
On multiplying (ii) by 4 and adding the result with (i), we get:
⇒ 3a + 4b + 8a – 4b = 32 + 12
⇒ 11a = 44
⇒ a = 4
Putting the value of a in (ii), we get:
2 × 4 – b = 3
⇒ 8 – b = 3
⇒ b = 5
Hence, the required values of a and b are 4 and 5, respectively.
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