Math, asked by bingiManish4120, 1 year ago

The sum of the third and the seventh terms of an ap is 6 and their product is 8 find the sum of first 16 terms of the ap

Answers

Answered by tuka81
2

Let the first term be a and common difference be d 

nth term = a+(n-1)d 

Given Third Term + Seventh term = (a+2d)+(a+6d) = 6 ==> a+4d = 3 

hence, a= 3-4d 

Third Term * Seventh term = (a+2d)*(a+6d) = 8 

(3-4d+2d)*(3-4d+6d) = 8==> (3-2d)*(3+2d) = 8 

i.e. 9-4d^2 = 8==> d^2 = (9-8)/4 = 0.25==> d = 0.5 or -0.5 

Now to check which is correct d... 

Substitute and find 

Case (a): d= 0.5 

a+4d = 3==> a=3-4d = 3-4(0.5)=1 

3rd term = a+2d= 1+2*0.5 = 2 

7th term = a+6d= 1+6*0.5 = 4 

Sum = 6 and Product = 8 

Case (b): d= -0.5 

a+4d = 3==> a=3-4d = 3-4(-0.5) = 3+2 = 5 

3rd term = a+2d= 5+2*(-0.5) = 4 

7th term = a+6d= 5+6*(-0.5) = 2 

Sum = 6 and Product = 8 

Since both are matching, we will go with bothvalues

Sum of first 16 terms = n*(2a+(n-1)d)/2 = 16*(2a+15d)/2 

= 8*(2a+15d) 

Case (a): d= 0.5 

Sum = 8*(2*1+15*0.5)=76 

Case (b): d= 0.5 

Sum = 8*(2*5+15*(-0.5))=20

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Answered by cloudboy55
2

plz refer to the attachment give above

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