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प्रश्न
Show that `x = - (bc)/(ad)` is a solution of the quadratic equation `ad^2((ax)/b + (2c)/d)x + bc^2 = 0`.
बेरीज
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उत्तर
Given:
Quadratic: `ad^2((ax)/b + (2c)/d)x + bc^2 = 0`
Proposed solution: `x = - (bc)/(ad)`.
Step-wise calculation:
1. Compute `(ax)/b` with `x = -(bc)/(ad)`:
`a xx x = a xx (-(bc)/(ad))`
= `(-(bc)/d)`
So, `(ax)/b = (-(bc)/d)/b`
= `-c/d`
2. Sum inside parentheses:
`(ax)/b + (2c)/d = −c/d + (2c)/d`
= `c/d`
3. Multiply by ad2 and x:
`ad^2 xx (c/d) xx x = (acd) xx x`
4. Substitute `x = -(bc)/(ad)`:
`(acd) xx (-(bc)/(ad)) = -bc^2`
5. Add bc2 the constant term:
–bc2 + bc2 = 0
Substituting `x = -(bc)/(ad)` into the quadratic yields 0, so `x = -(bc)/(ad)` is indeed a solution.
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