Math, asked by usmanrealspot77, 11 months ago

in an ap of 27 terms sum of three middle term is 177 and last three sum is 321 find the sum of last three term ​

Answers

Answered by fathimaroohee
0

Answer:

Step-by-step explanation:

Let the 1st term = x1

for a.p., constant term added = n

∴ we can write equation

x2 = x1 + n

x3 = x1 + 2n

xn = x1 + (n-1)n   .... (1)

There are total 27 terms

The middle term will be 14th term

∴ As per condition (1)

x13 + x14 + x15 = 177

substituting from equation 1 we get,

x13 = x1 + 12n

x14 = x1 + 13n

x15 = x1 + 14n

∴ x13 + x14 + x15 = (x1+12n) + (x1+13n) + (x1+14n) = 177    ..... (2)

∴3x1 + 39n = 177 .... (2)

For condition 2, sum of last three terms = 321

∴ x25 + x26 + x27 = 321

∴ (x1 + 24n) + (x1 + 25n) + (x1 + 26n) = 321

∴ 3x1 + 75n = 321   ...... (3)

∴ 3x1 = 321 - 75n..

substituting the value in equation 2, we get

(321 - 75n) + 39n = 177

∴ 321 - 177 = 75n - 39n

∴ 144 = 36n

∴ n = 4 .... (4)

Substtuting in eqn (3),

3x1 + 75× 4 = 321

∴ 3x1 + 300 = 321

∴ 3x1 = 21

∴ x1 = 7  .... (5)

1st 3 terms of a.p.

x1 = 7

x2 = x1 + n = 7 + 4 = 11

x3 = x2 + 2 = 11+ 4 = 15

∴ x1 = 7, x2 = 11, x3 = 15

hope it helps you

please mark as brainliest answer

Answered by muskan2807
2

Step-by-step explanation:

Let the 1st term = x1

for a.p., constant term added = n

.. we can write equation

x2 = x1 + n

x3 = x1 + 2n

xn = x1 + (n-1)n

- (1)

There are total 27 terms

The middle term will be 14th term

.. As per condition (1)

x13 + x14 + x15 = 177

MEa (0) Q 32 32

substituting from equation 1 we get,

x13 = x1 + 12n

x14 = x1 + 13n

x15 = x1 + 14n

:: x13 + x14 + x15 = (x1+12n) + (x1+13n)

+ (x1+14n) = 177

· (2)

::3x1 + 39n = 177.. (2)

For condition 2, sum of last three

terms = 321

x25 + x26 +x27 = 321

MEg (0) Q 32 32

-(X1 + 24n) + (x1 + 25n) + (x1 + 26n) =

321

: 3x1 + 75n = 321

.. 3x1 = 321 - 75n..

(3)

substituting the value in equation 2,

we get

(321 - 75n) + 39n = 177

. 321 - 177 = 75n - 39n

:: 144 = 36n

.. n = 4. (4)

Substituting in eqn (3),

3x1 + 75x 4 = 321

:: 3x1 + 300 = 321

:: 3x1 = 21

.. x1

= 7 . (5)

1st 3 terms of a.p.

x1 = 7

x2 = x1 + n = 7 + 4 = 11

x3 = x2 + 2 = 11+ 4 = 15

: x1

= 7x2 = 11, x 3 = 15

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