JEE 2022 | Sequence And Series | Anukram Tatha Shreni | A.P., G.P., H.P. Complete Revision | Maths

JEE Mains 2020 - Revision | Sequence And Series - Quick Revision + Questions | Maths

Introduction || Sequence || Series || Progression || Arithmatic Progression (A.P.) || A.P.terminologies || Consecutive terms OF A.P. || General apperence OF A.P. || Common difference OF A.P. Condition for a sequence to be A.P

Important formulas and concept for JEE mains | Complete syllabus Revision for Maths

Introduction OF Sequence and Series and A.P || Formation OF A.P and General term OF A.P

If the square of differences of three numbers be in A.P., then their differences re in (A) A.P. (B) G.P. (C) H.P. (D) none of these

if a sequence of number is in GP show that their logarithms are in A.P

In an equilateral triangle, inradius r , circumradius R and ex-radius r_1 are in A.P. (b) G.P. (c) H.P. (d) none of these

Let the positive numebrs a,b,c,d be in A.P. Then abc,abd,acd,bcd re (A) not in A.P., G.P., H.P. (B) in A.P. (C) in G.P. (D) in H.P.

a,b,x are in A.P.,a,b,y are in G.P. and a,b,z are in H.P. then: