Advertisements
Advertisements
प्रश्न
Write the first five terms of the following sequences whose nth terms are:
`a_n = (n(n - 2))/2`
उत्तर
Here, the nth term is given by the above expression. So, to find the first term we use n = 1, we get
`a_1 = (1(1 - 2))/2`
`= (-1)/2`
Similarly, we find the other four terms,
Second term (n = 2)
`a_2 = (2(2 - 2))/2`
`= (2(0))/2`
= 0
Third term (n = 3)
`a_3 = (3(3 - 2))/2`
`= (3(1))/2`
`= 3/2`
Fourth term (n = 4)
`a_4 = (4(4 - 2))/2`
`= (4(2))/2`
`= 8/2`
= 4
Fifth term (n = 5)
`a_5 = (5(5 -2))/2`
`= (5(3))/2`
= 15/2
Therefore, the first five terms for the given sequence are
`a_1 = (-1)/2 , a_2 =0, a_3 = 3/2, a_4= 4, a_5 = 15/2`
APPEARS IN
संबंधित प्रश्न
Which term of the A.P. 3, 15, 27, 39, … will be 132 more than its 54th term?
Which term of the A.P. 8, 14, 20, 26, ... will be 72 more than its 41st term?
Find the indicated terms in each of the following sequences whose nth terms are
an = n (n −1) (n − 2); a5 and a8
A man saved Rs 16500 in ten years. In each year after the first, he saved Rs 100 more than he did in the preceding year. How much did he save in the first year?
The nth term of an AP is (7 – 4n). Find its common difference.
Which term of the AP: 27, 24, 21, ……… is zero?
In an AP, if d = –4, n = 7, an = 4, then a is ______.
The 21st term of the AP whose first two terms are –3 and 4 is ______.
Write the first three terms of the APs when a and d are as given below:
a = –5, d = –3
How many numbers lie between 10 and 300, which when divided by 4 leave a remainder 3?
