Prove that if the number of terms of an A.P is odd then the middle term is the A.M between the first and last term???
Answer:
Proved that when number of terms of an A.P is odd then the middle term is the A .M between the first and last term
Solution:
To prove: If the number of terms of an A.P is odd then the middle term is the A .M between the first and last term
Proof:
Let the arithmetic progression be:
a, a + d, a + 2d, ........., (2n + 1) terms
As the number of terms are odd, the nth term is (2n + 1)
The middle term of (2n + 1)th term is:
[tex]\rightarrow \frac{(2n + 1 + 1)}{2} = \frac{2n + 2}{2}= (n + 1)[/tex]
Hence middle term is (n + 1)th term
The formula for nth term of arithmetic progression is:
[tex]a_n = a + (n - 1)d[/tex] ------- (i)
Where n is the terms location and "d" is the common difference between terms
Thus middle term is: (n + 1)th term
From (i)
[tex]\text{ middle term } = a + (n + 1 - 1)d = a + nd[/tex] ----- (ii)
Arithmetic mean between first and last term:
The nth term is (2n + 1)
Hence nth term (last term) is:
From (i)
[tex]\rightarrow a + (2n + 1 - 1)d = a + 2nd[/tex]
So Arithmetic mean between 1st & last term is:
First term of A.P = a
Arithmetic mean between first and last term = (first term + last term)/2
[tex]\rightarrow \frac{a + a + 2nd}{2}\\\\\rightarrow \frac{2a + 2nd}{2}\\\\\rightarrow a + nd[/tex] ----- (iii)
Thus from steps (ii) and (iii)
Middle term = AM of 1st and last terms [Proved]
Thus proved that when number of terms of an A.P is odd then the middle term is the A .M between the first and last term
