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Question
If 1 + 4 + 7 + 10 + ... + x = 287, find the value of x.
Sum
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Solution
Given: 1 + 4 + 7 + 10 + ... + x = 287, where the sequence is arithmetic with first term a = 1 and common difference d = 3.
Step-wise calculation:
1. Let n be the number of terms.
The last term x = a + (n – 1)d
= 1 + 3(n – 1)
= 3n – 2
2. Sum formula: `S = n/2 xx ("first" + "last")`
⇒ `287 = n/2 xx (1 + x)`
3. Substitute x = 3n – 2:
`287 = n/2 xx (1 + 3n - 2)`
= `n/2 xx (3n - 1)`
4. Multiply both sides by 2:
574 = n(3n – 1)
⇒ 3n2 – n – 574 = 0
5. Solve quadratic:
Discriminant Δ = (–1)2 – 4 × 3 × (–574)
= 1 + 6888
= 6889
= 832
6. n = (1 ± 83)/(6).
Positive root: `n = (1 + 83)/6`
= `84/6`
= 14
7. x = 3n – 2
= 3 × 14 – 2
= 42 – 2
= 40
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