Math, asked by anshu1815, 6 months ago

The sum of 5th and 9th terms of an ap is 30 if its 25th term is three times its 8th term find the AP.​

Answers

Answered by aruanu1815
5

Answer:

\huge{\boxed{\rm{\red{Question}}}}

The sum of 5th and 9th terms of an ap is 30 if its 25th term is three times its 8th term find the AP.

\huge{\boxed{\rm{\red{Answer}}}}

{\bigstar}\large{\boxed{\sf{\pink{Given \: that}}}}

The sum of 5th and 9th terms of an AP is 30.

25th term is three times its 8th term.

{\bigstar}\large{\boxed{\sf{\pink{To \: find}}}}

The AP.

{\bigstar}\large{\boxed{\sf{\pink{Solution}}}}

\large\purple{\texttt{In the first case}}

\large\orange{\texttt{The sum of 5th and 9th terms of an AP is 30}}

↝ a⁵ + a⁹ = 30 {a⁵ means 5th term} ; {a⁹ means 9th term}

↝ a + 4d + a + 8d = 30

↝ 2a + 12d = 30 \large\red{\texttt{Equation 1}}

\large\purple{\texttt{In the second case}}

\large\orange{\texttt{25th term is three times its 8th term}}

↝ a²⁵ = 3(a⁸) {a²⁵ means 25th term}

↝ a + 24d = 3 (a+7d)

↝ a + 24d = 3a + 28d

↝ a + 24d - 3a - 21d = 0

↝ -2a + 3d = 0 \large\red{\texttt{Equation 2}}

Now we have to add \large\red{\texttt{Equation 1}} and \large\red{\texttt{Equation 2}}

↝ 2a + 12d - 2a + 3d = 30

↝ 15d = 30

↝ d = 30/15

↝ d = 2

\large{\boxed{\texttt{Now we have to substitute d = 2 in equation 1}}}

↝ 2a + 12d = 30

↝ 2a + 12(2) = 30

↝ 2a + 24 = 30

↝ 2a = 30 - 24

↝ 2a = 6

↝ a = 6/2

↝ a = 3

Hence, the first term is 3

The second term is 3 + 2 = 5

The third term is 3 + 4 = 7

The AP is 3,5,7

Hope it's helpful.

Thank you :)

Answered by Anonymous
14

Answer:

Step-by-step explanation:

Given:-

The sum of 5th and 9th terms of an AP is 30.

25th term is three times its 8th term.

To Find:-

The AP

Solution:-

Case 1:-

The sum of 5th and 9th terms of an AP is 30.

 \sf \implies a_{5} +  a_{9} = 30

 \sf \implies a + 4d +  a + 8d = 30

 \sf \implies 2a + 12d = 30......(i)

Case 2:-

25th term is three times its 8th term.

 \sf \implies a_{25}  = 3(  a_{8})

 \sf \implies a + 24d  = 3(a + 7d)

 \sf \implies a + 24d  = 3a + 21d

 \sf \implies a + 24d - 3a - 21d = 0

 \sf \implies -2a + 3d = 0......(ii)

Adding (i) and (ii):-

 \sf \implies 2a + 12d - 2a + 3d = 30

 \sf \implies 15d = 30

 \sf \implies d = \dfrac{30}{15}

 \sf \implies d = 2

Substitute d = 2 in equation (i)

 \sf \implies 2a + 12d = 30

 \sf \implies 2a + 12(2) = 30

 \sf \implies 2a = 30 - 24

 \sf \implies 2a = 6

 \sf \implies a = \dfrac{6}{2}

 \sf \implies a = 3

The first term = a = 3

The second term = a + d = 3 + 2 = 5

The third term = a + 2d = 3 + 4 = 7

\large\underline{\boxed{\sf \therefore The \: AP = 3,5,7,9.....}}

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