Advertisements
Advertisements
प्रश्न
Find the missing entry in the following table
| x | 0 | 1 | 2 | 3 | 4 |
| yx | 1 | 3 | 9 | - | 81 |
Advertisements
उत्तर
Since only four values of f(x) are given the polynomial which fits the data is of degree three.
Hence fourth differences are zeros.
i.e Δ4y0 = 0
(E – 1)4y0 = 0
(E4 – 4E3 + 6E2 – 4E + 1) y0 = 0
E4y0 – 4E3y0 + 6E2y0 – 4Ey0 + 1y0 = 0
y4 – 4y3 + 6y2 – 4y1+ y0 = o
81 – 4y3 + 6(9) – 4(3) + 1 = 0
81 – 4y3 + 54 – 12 + 1 = 0
136 – 12 – 4y3 = 0
4y3 = 124
y3 = `124/4`
∴ y3 = 31
APPEARS IN
संबंधित प्रश्न
Evaluate Δ(log ax)
Evaluate Δ`[1/((x + 1)(x + 2))]` by taking ‘1’ as the interval of differencing
Following are the population of a district
| Year (x) | 1881 | 1891 | 1901 | 1911 | 1921 | 1931 |
| Population (y) Thousands |
363 | 391 | 421 | - | 467 | 501 |
Find the population of the year 1911
Choose the correct alternative:
Δf(x) =
Choose the correct alternative:
If m and n are positive integers then Δm Δn f(x)=
Choose the correct alternative:
∇ ≡
If f(x) = eax then show that f(0), Δf(0), Δ2f(0) are in G.P
Prove that (1 + Δ)(1 – ∇) = 1
Prove that Δ∇ = Δ – ∇
Prove that EV = Δ = ∇E
