prove that 9 added to the sum of any number of consecutive terms of 7,9,11,13..etc from the beginning is a perfect square
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Page No 39:
Question 1:
State whether the given algebraic expressions are polynomials? Justify.
(i) y + 1y (ii) 2 - 5 √x (iii) x2 + 7x + 9 (iv) 2m-2 + 7m - 5 (v) 10
ANSWER:
In an algebraic expression, if the powers of the variables are whole numbers then the algebraic expression is a polynomial.
(i)
y+1y=y+y-1
Here, one of the powers of y is −1, which is not a whole number. So, y + 1y is not a polynomial.
(ii)
2 - 5 √x=2-5x12
Here, the power of x is 12, which is not a whole number. So, 2 - 5 √x is not a polynomial.
(iii)
x2 + 7x + 9
Here, the powers of the variable x are 2, 1 and 0, which are whole numbers. So, x2 + 7x + 9 is a polynomial.
(iv)
2m-2 + 7m - 5
Here, one of the powers of m is −2, which is not a whole number. So, 2m-2 + 7m - 5 is not a polynomial.
(v)
10 = 10 × 1 = 10x0
Here, the power of x is 0, which is a whole numbers. So, 10 is a polynomial (or constant polynomial).
Answer:
thus is the solution of your question
Step-by-step explanation:
10=10×1=10×0