Question

1.Assertion:Sum of two irrational numbers 2+√3 and 4+√3 is irrational. Reason:Sum of two irrational numbers is always an irrational number.
optios Both assertion(A) and reason (R) are true and reason (R) is the correct explanation of
Both assertion (A) and reason (R)are true but reason (R)is not the correct not correct
assertion (A) is true but reason (R)is false
assertion (A) is false but reason (R)is true.

Answer 1

Answer:

Assertion is true but reason is false

Step-by-step explanation:

for proving reason false , we can take example

sum of 2+√3 and 2-√3

it is a rational number..

Please mark my answer as brainlest ❤️

Answer 2

Given :

Assertion(A): sum of two irrational number 2+√3 and 4+√3 is irrational

Reason(R): sum of two irrational number is always an irrational number

To Find : Correct option

Solution:

Assertion(A): sum of two irrational number 2+√3 and 4+√3 is irrational

2+√3 + 4+√3

= 6 + 2√3

irrational number

Correct

Reason(R): sum of two irrational number is always an irrational number

INCORRECT

Irrational number 2 +  √3  and 2 - √3

Sum = 2 + √3  + 2 - √3  

= 4

which is rational number

c) Assertion (A ) is true But reason (R) is False.

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