Advertisements
Advertisements
प्रश्न
Split 207 into three parts such that these parts are in A.P. and the product of the two smaller parts in 4623.
उत्तर
Let the three parts in A.P. be (a – d), a and (a + d)
Then, (a – d) + a + (a + d) = 207
`\implies` 3a = 207
`\implies` a = `207/3` = 69
It is given that
(a – d) × a = 4623
`\implies` (69 – d) × 69 = 4623
`\implies` 69 – d = `4623/69` = 67
`\implies` d = 69 – 67 = 2
`\implies` a = 69 and d = 2
Thus, we have
a – d = 69 – 2 = 67
a = 69
a + d = 69 + 2 = 71
Thus, the three parts in A.P. are 67, 69 and 71.
APPEARS IN
संबंधित प्रश्न
The angles of a quadrilateral are in A.P. with common difference 20°. Find its angles.
Q.2
Q.4
Q.8
Find the A.P. whose nth term is 7 – 3K. Also find the 20th term.
Find the nth term and the 12th term of the list of numbers: 5, 2, – 1, – 4, …
Is 0 a term of the A.P. 31,28, 25,…? Justify your answer.
Determine the A.P. whose fifth term is 19 and the difference of the eighth term from the thirteenth term is 20.
The 15th term of an A.P. is 3 more than twice its 7th term. If the 10th term of the A.P. is 41, find its nth term.
The sum of 5th and 7th terms of an A.P. is 52 and the 10th term is 46. Find the A.P.
