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प्रश्न
Factorise the following:
5(a – 2b)3 + 15(a – 2b)2 – 25(a – 2b)
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उत्तर
Given expression: 5(a – 2b)3 + 15(a – 2b)2 – 25(a – 2b)
Step-wise calculation:
1. Identify the common factor in all terms.
Here, each term contains a factor of 5(a – 2b).
2. Factor 5(a – 2b) out:
5(a – 2b)3 + 15(a – 2b)2 – 25(a – 2b)
= 5(a – 2b) [(a – 2b)2 + 3(a – 2b) – 5]
3. Let x = (a – 2b), then the expression inside the bracket becomes x2 + 3x – 5
4. Try to factorise x2 + 3x – 5:
The quadratic does not factor neatly over integers, so this is the simplified factorisation.
5(a – 2b)3 + 15(a – 2b)2 – 25(a – 2b)
= 5(a – 2b) [(a – 2b)2 + 3(a – 2b) – 5]
This is the fully factorised form by taking out the common factor.
Alternatively, from the source, the answer given is:
5(a – 2b) (a2 – 4ab + 4b2 + 3a – 6b – 5)
Which matches the expanded form of (a – 2b)2 + 3(a – 2b) – 5.
Hence, 5(a – 2b) (a2 – 4ab + 4b2 + 3a – 6b – 5).
