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प्रश्न
Below u, v, w and x represent different integers, where u = –4 and x ≠ 1. By using following equations, find each of the values:
u × v = u
x × w = w
u + x = w
- v
- w
- x
Explain your reasoning using the properties of integers.
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उत्तर
We have, three equations
u × v = u ...(i)
x × w = w ...(ii)
u + x = w ...(iii)
and u = –4
a. By putting the value of u in equation (i), we get
(–4) × v = (–4)
⇒ `v = ((-4))/((-4))`
⇒ v = 1
b. From equation (ii),
x × w = w
⇒ `x = w/w`
⇒ x = 1
But, Hence x × w = w, (ii) is possible, when w = 0 (x ≠ 1).
c. From equation (iii),
u + x = w
Put u = –4 and w = 0, we get
⇒ –4 + x = 0
⇒ x = 4
∴ v = 1, x = 4 and w = 0
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| Column I | Column II |
| (a) a × 1 | (i) Additive inverse of a |
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| (d) a × (–1) | (iv) a ÷ (–b) |
| (e) a × 0 | (v) a ÷ b |
| (f) (–a) ÷ b | (vi) a |
| (g) 0 | (vii) –a |
| (h) a ÷ (–a) | (viii) 0 |
| (i) –a | (ix) –1 |
