find the degree of each of the following polynomial x+1
Answers
Answer:
Degree of a polynomial in one variable = highest power of the variable in algebraic expression (i) 2x – 1 Power of x = 1 Highest power of the variable x in the given expression = 1 Hence, degree of the polynomial 2x – 1 = 1 (ii) –10 There is no variable in the given term. Let us assume that the variable in the given expression is x. – 10 = –10x0 Power of x = 0 Highest power of the variable x in the given expression = 0 Hence, degree of the polynomial – 10 = 0 (iii) x3 – 9x + 3x5 Powers of x = 3, 1 and 5 respectively. Highest power of the variable x in the given expression = 5 Hence, degree of the polynomial x3 – 9x + 3x5= 5 (iv) y3 (1 – y4) The equation can be written as, y3 (1 – y4) = y3 – y7 Powers of y = 3 and 7 respectively. Highest power of the variable y in the given expression = 7 Hence, degree of the polynomial y3 (1 – y4) = 7Read more on Sarthaks.com - https://www.sarthaks.com/866170/determine-the-degree-of-each-of-the-following-polynomials
Answer:
1
Step-by-step explanation:
1 being a number / constant has no degree here
and the variable x has the highest degree of 1 .
which complies that the final answer or the highest degree is 1