Assertion(A): (2-√3) is one zero of the quadratic polynomial then other zero will be (2+√3). Reason (R) : Irrational zeros (roots) always occurs in pairs. 1 point a)Both A and R are true and R is the correct explanation for A b)Both A and R are true and R is not the correct explanation for A c)A is true but R is false d)A is false but R is true.
Answers
Answer:
Both A and R are true and R is not the correct
Step-by-step explanation:
Both A and R are true and R is not the correct
because always 2² is not equal to π³
SOLUTION
GIVEN
Assertion(A): (2-√3) is one zero of the quadratic polynomial then other zero will be (2+√3).
Reason (R) : Irrational zeros (roots) always occurs in pairs.
TO CHOOSE THE CORRECT OPTION
a)Both A and R are true and R is the correct explanation for A
b)Both A and R are true and R is not the correct explanation for A
c)A is true but R is false
d)A is false but R is true.
EVALUATION
Assertion(A): (2-√3) is one zero of the quadratic polynomial then other zero will be (2+√3).
Since (2-√3) is one zero of the quadratic polynomial
We know that if a - √b is a root of the equation then another root is a + √b
So Assertion is right
Reason (R) : Irrational zeros (roots) always occurs in pairs.
We know that if a - √b is a root of the equation then another root is a + √b
Thus Irrational zeros (roots) always occurs in pairs.
So Reason is correct
Also Result is the correct explanation for Assertion
FINAL ANSWER
Hence the correct option is
a) Both A and R are true and R is the correct explanation for A
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