If a_1,a_2,a_3\dots \ \text{and} \ b_1,b_2,b_3\dots are geometric sequences, show

Wierzycaz

Wierzycaz

Answered question

2021-08-21

If a1,a2,a3 and b1,b2,b3 are geometric sequences, show that a1b1,a2b2,a3b3, is also geometric sequence.

Answer & Explanation

BleabyinfibiaG

BleabyinfibiaG

Skilled2021-08-22Added 118 answers

Use the geometric sequence property
If a,,b and c are geometric sequence then b2=a×c
Now a1,a2,a3 are in G.P.
a22=a1×a3
Also b1,b2,b3 are in G.P.
b22=b1×b3
Now the sequence a1b1,a2b2,a3b3, would be in G.P
If (a2b2)2=a1b1×a3b3
Consider the left-hand side (a2b2)2
Simplifying, we get
(a2b2)2=a22×b22
Substitute a22=a1×a3 and b22=b1×b3 in above equation
(a2b2)2=a1×a3×b1×b3
Rewrite the above equation
(a2b2)2=(a)1b1a3b3
Which implies that a1b1,a2b2,a3b3, are in a geometric sequence

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