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If x + 1 = 2 , then the value of 
x2 + 1 
x3 + 1 is x x2 x3
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- 20
- 4
- 8
- 16
- 20
Correct Option: B
| ⇒ x + | = 2 | |
| x |
On squaring both sides,
| ⇒ x2 + | + 2 = 4 | |
| x2 |
| ⇒ x2 + | = 4 – 2 = 2 | |
| x2 |
| Again , x + | = 2 | |
| x |
On cubing both sides,
| ⇒ | | x + | | 3 | = 8 | |
| x |
| ⇒ x3 + | + 3 | | x + | | = 8 | ||
| x3 | x |
| ⇒ x3 + | = 8 - 3 × 2 = 2 | |
| x3 |
| ∴ | | x2 + | | | x3 + | | = 2 × 2 = 4 | ||
| x2 | x3 |
Second Method :
Using Rule 14,
| Here, x + | = 2 | |
| x |
| x2 + | = 2 and x3 + | = 2 | ||
| x2 | x3 |
| ∴ | | x2 + | | | x3 + | | = 2 × 2 = 4 | ||
| x2 | x3 |
