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प्रश्न
Simplify and express the Solution in the positive exponent form:
`("a"^-7 xx "b"^-7 xx "c"^5 xx "d"^4)/("a"^3 xx "b"^-5 xx "c"^-3 xx "d"^8)`
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उत्तर
`("a"^-7 xx "b"^-7 xx "c"^5 xx "d"^4)/("a"^3 xx "b"^-5 xx "c"^-3 xx "d"^8)`
We will use the following rules of exponents:
1. `a^m/a^n = a^(m-n)`
2. am × an = am+n
3. For any negative exponent `a^-n = 1/a^n`
For a: `a^-7/a^3 = a^(-7-3) =a^-10`
For b: `b^-7/b^-5 = b^(-7+5) = b^-2`
For c: `c^5/c^-3 = c^(5+3) = c^8`
For d: `d^4/d^8 = d^(4-8) = b^-4`
Now, combine all the simplified terms: a−10 × b−2 × c8 × d−4
We can rewrite terms with negative exponents as fractions:
`1/a^10 xx 1/b^2 xx c^8 xx 1/d^4`
This gives
`c^8/(a^10 xx b^2 xx d^4)`
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