Chapter no.2 POLYNOMIALS ( Exercise 2.3 )
Today we are going to learn the Remainder Theorem and the questions of Exercise 2.3
REMAINDER THEOREM :-
Remainder theorem gives a method to find the remainder without actual division, when a Polynomial p(x) with degree greater than or equal to 1 , is divided by a binomial of the form (x -a).
1) If p(x) is divided by x+a , the remainder is p(-a).
2) If p(x) is divided by ax +b , then remainder is p( -b/a).
Now observe the examples,
Today we are going to learn the Remainder Theorem and the questions of Exercise 2.3
REMAINDER THEOREM :-
Remainder theorem gives a method to find the remainder without actual division, when a Polynomial p(x) with degree greater than or equal to 1 , is divided by a binomial of the form (x -a).
1) If p(x) is divided by x+a , the remainder is p(-a).
2) If p(x) is divided by ax +b , then remainder is p( -b/a).
Now observe the examples,
Now observe the Exercise 2.3 and write the solutions in your own steps.
The video of Solutions of Exercise 2.3 are available in following link
Assignment ( Other examples for practice)
Homework :- Solve Exercise 2.3 and also Assignment.
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