Question

determine the ap whose third term is 16 and 7th term is exceeds the 5th term by 12

Answer 1

Step-by-step explanation:

we know that

a=a +(n -1)d

so ,

a=a +(3-1 )d

a=a+2d

16-a+2d

also

a=a+(8-1)d

a=a+6d

similarly

a=a+(4-1)d

a=a+4d

Answer 2

Step-by-step explanation:

AnswEr :

Given -

3rd term is 16 & 7th term exceeds 5th term by 12.

We know the formula,

$\longrightarrow\sf \Big[a_{n} = a + (n - 1) d \Big]$

$\longrightarrow\sf a_{3} = a + (3 - 1)d$

$\longrightarrow\sf a_{3} = a + 2d$

Third term of the AP is 16. So,

$\longrightarrow\sf a + 2d = 16 \;\;\;\;\;\;\: ...eq.(1)$

Similarly,

$\longrightarrow\sf a_{7} = a + 6d \\ \\ \longrightarrow\sf a_{5} = a + 4d$

$\rule{150}2$

$\longrightarrow\sf a_{7} - a_{5} = 12 \\ \\ \longrightarrow\sf a + 6d - [a + 4d] = 12 \:\;\;\; \; a_{7} = a + 6d \: \& \; a_{5} = a + 4d \\ \\ \longrightarrow\sf \cancel{ a} + 6d \: \cancel{- a} - 4d = 12 \\ \\ \longrightarrow\sf 2d = 12 \\ \\ \longrightarrow\sf d = \cancel\dfrac{12}{2} \\ \\ \longrightarrow\sf\red{d = 6}$

Substituting the value of d in eq. (1) -

$\longrightarrow\sf a + 2 \times 6 = 16 \\ \\ \longrightarrow\sf a + 12 = 16 \\ \\ \longrightarrow\sf a = 16 - 12 \\ \\ \longrightarrow\sf\red{a = 4}$

Now, we get the values of a & d.

Hence, the Arithmetic progression is - a, a + d, a + 2d, a + 3d and so on.

$\longrightarrow\sf 4, 4 + 6, 4 + 2 \times 6 , 4 + 3 \times 6 \\ \\ \longrightarrow\sf 4, 10, 16, 22 \: and \; so \; on.$

$\rule{150}2$