An infinite G.P. has 2^(nd) term x and i...

An infinite `G.P.` has `2^(nd)` term `x` and its sum is `4`. Then `x` belongs to

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Statement 1: If an infinite G.P. has 2nd term x and its sum is 4, then x belongs to (-8,1)dot Statement 2: Sum of an infinite G.P. is finite if for its common ratio r ,0<|r|<1.

Statement 1: If an infinite G.P. has 2nd term x and its sum is 4, then x belongs to (-8,1)dot Statement 2: Sum of an infinite G.P. is finite if for its common ratio r ,0<|r|<1.

Statement 1: If an infinite G.P. has 2nd term x and its sum is 4, then x belongs to (-8,1)dot Statement 2: Sum of an infinite G.P. is finite if for its common ratio r ,0<|r|<1.

If an infinite G.P. has 2nd term x and its sum is 4, then prove that x in(-8,1]-{0}

If an infinite G.P. has 2nd term x and its sum is 4, then prove that xin(-8,1]-{0}

If an infinite G.P. has 2nd term x and its sum is 4, then prove that xin(-8,1]-{0}

An infinite G.P. has first term as a and sum as 5, then

In an infinite G.P. second term is x and its sum is 4, then complete set of values of x is in

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