Question

phrase'get along ' means
compromise
qurallel
adjust
​

Answer 1

Answer:

compromise

Explanation:

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Answer 2

Answer:

According to the Question

Let a be first term be a

And Common Difference be d

Therefore

\bf\huge a_{p} = q , a_{q} = pa

p

=q,a

q

=p

a + (p - 1)d = q ……. (1)

a + (q - 1)d = p ……..(2)

Subtracting equations we get :-

(p - q)d = q - p

d = -1

Put the value of d in eq (1) :-

a + (p - 1)(-1) = q

a = (p + q - 1)

\bf\huge a_{p + q} = a + (p + q - 1)da

p+q

=a+(p+q−1)d

= (p + q - 1) + (p + q - 1)(-1)

= 0

Hence we get the (p + q)th term is Zero