if a2, b2,c2 are in a A.P .then prove that the following are also in A.P (i) 1/b+c ,1/c+a ,1/a+b (ii) a/b+c , b/a+c ,c/b+a
Find the sum to n terms of the series :- 5 + 11 + 19 + 29 + 41 +..........
Find the sum of integers from 1 to 100 that are divisible by 2 or 5.
a thief runs away from a police station with a uniform speed of100 m per min. after a minute a policeman runs behind him to catch. he goes at a speed of 100 m in 1st min and increases his speed by 10 m each succeeding min. after how many min, the policeman catch the thief?
If the pth, qth and rth terms of a GP be a, b, c respectively, prove that
a^(q-r).b^(r-p).c^(p-q)=1;
where ^=raised to the power
The third term of a GP is 4 , find the product of its first five terms .
( answer = 1024 )
If a2, b2, c2, are in AP, then show that a/b+c, b/c+a, c/a+b are in AP.
If there are (2n+1) terms in A.P,then prove that the ratio of the sum of odd terms and the sum of even terms is (n+1):n.
if (m+1)th term of an AP is twice the n+1th term, prove that (3m+1)th term is twice the (m+n+1)th term.
please answer ASAP, exam tmrw.
If 7 times the 7th term of an A.P. is equal to 11 times the 11th term,show that 18th term of A.P. is 0.
The sum of 11 terms of an AP whose middle term s 30 is
(1) 320 (2)330 (3)340 (4)350
Sum the series: 1+3+7+15+31+............to n terms.
If a, b , c are in G.P, and x, y be the arithmetic means of a, b and b, c respectively, prove that (i) a/x+c/y=2 (ii)1/x + 1/y= 2/b
If first term ,second , and last term of an A.P be a ,b , c, respectively . Then show that the sum is
(b+c-2a) (a+c) / 2(b-a) .
how many terms of the sequence 18,16,14......should be taken so that their sum is zero.
if a2, b2,c2 are in a A.P .then prove that the following are also in A.P (i) 1/b+c ,1/c+a ,1/a+b (ii) a/b+c , b/a+c ,c/b+a
Find the sum to n terms of the series :- 5 + 11 + 19 + 29 + 41 +..........
Find the sum of integers from 1 to 100 that are divisible by 2 or 5.
a thief runs away from a police station with a uniform speed of100 m per min. after a minute a policeman runs behind him to catch. he goes at a speed of 100 m in 1st min and increases his speed by 10 m each succeeding min. after how many min, the policeman catch the thief?
If the pth, qth and rth terms of a GP be a, b, c respectively, prove that
a^(q-r).b^(r-p).c^(p-q)=1;
where ^=raised to the power
The third term of a GP is 4 , find the product of its first five terms .
( answer = 1024 )
If a2, b2, c2, are in AP, then show that a/b+c, b/c+a, c/a+b are in AP.
If there are (2n+1) terms in A.P,then prove that the ratio of the sum of odd terms and the sum of even terms is (n+1):n.
if (m+1)th term of an AP is twice the n+1th term, prove that (3m+1)th term is twice the (m+n+1)th term.
please answer ASAP, exam tmrw.
If 7 times the 7th term of an A.P. is equal to 11 times the 11th term,show that 18th term of A.P. is 0.
The sum of 11 terms of an AP whose middle term s 30 is
(1) 320 (2)330 (3)340 (4)350
Sum the series: 1+3+7+15+31+............to n terms.
If a, b , c are in G.P, and x, y be the arithmetic means of a, b and b, c respectively, prove that (i) a/x+c/y=2 (ii)1/x + 1/y= 2/b
If first term ,second , and last term of an A.P be a ,b , c, respectively . Then show that the sum is
(b+c-2a) (a+c) / 2(b-a) .
how many terms of the sequence 18,16,14......should be taken so that their sum is zero.