Assertion:- If √2=1.414,√3=1.732,then √5=√2+√3
Reason:- Square root of a positive real number always Exists
Answers
Answer:
A is true and R is also false
Step-by-step explanation:
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Answer:
Here is required answer.
Step-by-step explanation:
Assertion :- If √2=1.414,√3=1.732,then √5=√2+√3
the value of root 5 is, √5 = 2.236 You can find the value of the square root of all the non-perfect square number with the help of the long division method. This is the old method which gives the exact value of the root of numbers.
But √2+√3 is equal to 3.146
It means √5 is not equal to √2+√3 .
Here , Assertion is not true
Reason :- Square root of a positive real number always Exists
Every positive real number has a square root. More precisely, if c is a positive real number, then there exists one and only one positive real number x such that x2 = c.
Here , Reason is true .
Therefore , Assertion is not true but Reason is true .
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