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प्रश्न
If the nth terms of the progression 5, 10, 20, ... and the progression 1280, 640, 320, ... are equal, then find the value of n.
बेरीज
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उत्तर
a = 5
r = 2
`a_n = ar^(n - 1)`
`a_n = 5(2)^(n - 1)`
a = 1280
r = `640/1280`
= `1/2`
`a_n = ar^(n - 1)`
`a_n = 1280(1/2)^(n - 1)`
`5(2)^(n - 1) = 1280(1/2)^(n - 1)`
`(2)^(n - 1) = 1280/5(1/2)^(n - 1)`
`(2)^(n - 1) = 256(1/2)^(n - 1)`
`(2)^(n - 1) = (2^8(1)^(n - 1))/(2)^(n - 1)`
`(2)^(n - 1) = 2^(8 - n - 1)`
`(2)^(n - 1) = (2)^(8 - n + 1)`
`(2)^(n - 1) = (2)^(9 - n)`
n − 1 = 9 − n
n + n = 9 + 1
2n = 10
n = `10/2`
n = 5
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