if p, q, r be in arithmetic progression, then show that the pth, qth and rth terms of any geometric
Published 4 years ago • 665 plays • Length 5:37
Download video MP4
Download video MP3
Similar videos
-
5:27
if pth, qth and rth terms of an a.p. are a, b, c respectively, then show that a(q-r) b(r-p) c(p-q)=0
-
3:42
if the `pth, qth, rth` terms of a `g. p.` be `a, b, c` respectively, prove that `a^(q-r)b^(r-p)...
-
7:21
if the pth, qth and rth term of an ap be a,b and c respectively, show that a(q-r) b(r-p) c(p-q)=0
-
4:47
if x ,y.z are the pth ,qth are rth term of an a.p... then show that - x(q-r) y(r-p) z(p-q) = 0
-
6:30
if pth qth and rth term of an ap are a b c respectively then show that a(q-r) b(r-p) c(p-q)=0 | q 15
-
3:26
if `p ,q ,r` are in a.p., show that the pth, qth and rth terms of any g.p. are in g.p.
-
1:09
if pth, qth, and rth terms of an a.p. are `a ,b ,c ,` respectively, then show that `a(q-r) b(r-p) c
-
6:12
the pth, qth and rth term of an ap is a , b and c respectively. show that a(q-r) b(r-p) c(p-q) =0
-
7:03
if pth, qth, rth term of a g.p. are a, b, c respectively. prove that a^(q-r).b^(r-p).c^(p-q)=1
-
4:03
.2 (a) if pth, qth, rth term of an a.p. are a, b, c respectively, show that (q-r)a (r-p)b (p-q)...
-
5:12
if the pth, qth and rth terms of a g.p, are x,y and z repectively, then prove that |{:(logx,p,1)...
-
5:40
if pth, qth , rth and sth term of an gp are in gp,then prove that:- (p-q),(q-r),(r-s)are also in gp
-
4:22
if the pth ,qth and rth terms of an ap are in g.p then the common ration of the gp is | class 1...
-
3:17
in an a.p. if pth is q and qth term is p, then show that (p q)th term is zero
-
3:06
the pth term of an ap is q and qth term is p. show that it's (p q)th term is zero
-
3:46
if the pth term of an a.p. is q and the qth term is p, prove that its nth term is (p q-n)...
-
0:35
😱🔥if pth term is q and qth term is p then rth term will be p q-r #shorts #arithmeticprogression
-
1:00
if pth,qth,rth terms of a.p are a,b,c then a(q-r) b(r-p) c(p-q)=?#shorts #class11 math#nda #jee
-
13:11
if the pth, qth and rth terms of an a.p be a, b and c respe, then prove that a(q-r) b(r-p) c(p-q)=0
Clip.africa.com - Privacy-policy