Math, asked by chaudharysaloni008, 7 hours ago

Assertion (a)= 2^10 + 2^4 = 2^6 ...

Reason (r)= if a > 0 be a real number and p and q be rational number, then a^p xa^q= a^p+q

please give me this answer with solution....​

Answers

Answered by sanchitajain1001
2

Answer:

A is false but R is true...

Answered by amitnrw
0

Given : Assertion (A)= 2¹⁰ + 2⁴ = 2⁶

Reason (R)  if a > 0 be a real number and p and q be rational number, then a^p x a^q= a^(p+q)    a^p \times a^q=a^{p+q}  

To Find : Comments on Assertion and Reason

Solution:

Assertion (A)= 2¹⁰ + 2⁴ = 2⁶

2¹⁰ + 2⁴

= 2⁴ (2⁶  + 1)

= 2⁴ ( 64 + 1)

= 2⁴ (65)

≠ 2⁶    (∵  2⁶ = 64 )

Hence Assertion (A) is FALSE

Reason (R)  if a > 0 be a real number and p and q be rational number, then

a^p x a^q= a^(p+q)

   a^p \times a^q=a^{p+q}  

Reason (R)  is True

So Correct answers is Assertion (A) is False and Reason (R) is True

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