[" In an arithmetic progression the "(p+...

[" In an arithmetic progression the "(p+1)^(th)],[" term is twice the "(q+1)^(th)" term.If its "],[(3p+1)^(h)" term is "lambda" times the "],[(p+q+1)^(h)" term,then "lambda" is equal to "]

Similar Questions

Explore conceptually related problems

In an arithmetic progression the (p+1)^("th") term is twice the (q+1)^("th") term. If its (3p+1)^("th") term is lambda times the (p+q+1)^("th") term, then lambda is equal to

If (m+1)^(th) term of an A.P.is twice the (n+1)^(th) term,prove that (3m+1)^(th) term is twice the (m+n+1)^(th) term.

If (p + 1)th term of an A.P. is twice the (q + 1)th term, then prove that (3p + 1) th term will be twice the (p + q + 1)th term.

Given that the (p+1)th term of an A.P. is twice the (q+1)th term, prove that the (3p+1)th term is twice the (p+q+1)th term.

If p^(th) term of an AP is q and q^(th) term is p, find (p+q)^(th) term.

If P-th term of an arithmetic progression be Q and Q-th term be P.then show that (P+Q)thterm is O.

If the pth term of an arithmetic progression is q and the qth term is p, show that its (p+q)th term is 0.

[" In an arithmetic progression the "(p+1)^(th)],[" term is twice the "(q+1)^(th)" term.If its "],[(3p+1)^(h)" term is "lambda" times the "],[(p+q+1)^(h)" term,then "lambda" is equal to "]

Similar Questions

Recommended Questions