Question

write the 5 terms of ap whose a is 5 and d is 4​

Answer 1

$\huge\mathfrak{Answer}$

Given -

the first term that is, a = 5 and

the common difference that is d = 4

To find -

5 terms of the ap

calculation -

we know that A.P is represented as -

a, a+d, a+ 2d, a+ 3d and so on...

Therefore,

First term of A.P is => a = 5

Second term of A.P is => a + d = 5 + 4 = 9

Third term of A.P is => a + 2d = 5 + 2(4) = 13

Fourth term of A.P is => a + 3d = 5 + 3(4) = 17

and the Fifth term is => a + 4d = 5 + 4(4) = 21

Thus, the 5 terms of A.P are => 5, 9, 13, 17, 21

Answer 2

Explanation:

ANSWER________✍️

Given -✨

the first term that is, a = 5 and

the common difference that is d = 4

To find -

5 terms of the ap

calculate ⤵️

we know that A.P is represented as -

a, a+d, a+ 2d, a+ 3d and so on...

So now,

First term of A.P is ➡️ a = 5

Second term of A.P is ➡️a + d = 5 + 4 = 9

Third term of A.P is ➡️ a + 2d = 5 + 2(4) = 13

Fourth term of A.P is ➡️ a + 3d = 5 + 3(4) = 17

and the Fifth term is ➡️ a + 4d = 5 + 4(4) = 21

Thus, the 5 terms of A.P are ➡️5, 9, 13, 17, 21

hope this helps you