Given Arithmetic Progression 12, 16, 20, 24, . . . Find the 24th term of this progression. Solve the word problem
Answers
Answered by
44
Your answer is --
Given AP : 12 , 16 , 20 , 24
Now, first term a = 12
and
common difference d = 16 - 12 = 4
Therefore ,
24th term is
T24 = a + (24-1) d
= 12 + 23 × 4
= 12 + 92
= 104
Hence, 24th term is 104
【 Hope it helps you 】
# crockroax
Given AP : 12 , 16 , 20 , 24
Now, first term a = 12
and
common difference d = 16 - 12 = 4
Therefore ,
24th term is
T24 = a + (24-1) d
= 12 + 23 × 4
= 12 + 92
= 104
Hence, 24th term is 104
【 Hope it helps you 】
# crockroax
Answered by
14
Hey dear,
● Answer -
t24 = 104
● Step-by-step solution -
Common difference for given AP can be calculated as -
d = 16-12 = 20-16 = 24-20 = 4
Now, nth term for given AP is calculated by -
tn = a + (n-1)d
Putting a = 12, d = 4, n = 24
t24 = 12 + (24-1)4
t24 = 12 + 92
t24 = 104
Therefore, 24th term of given AP is 104.
Thanks for asking..
● Answer -
t24 = 104
● Step-by-step solution -
Common difference for given AP can be calculated as -
d = 16-12 = 20-16 = 24-20 = 4
Now, nth term for given AP is calculated by -
tn = a + (n-1)d
Putting a = 12, d = 4, n = 24
t24 = 12 + (24-1)4
t24 = 12 + 92
t24 = 104
Therefore, 24th term of given AP is 104.
Thanks for asking..
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