The set of all polynomials of degree 4 under the standard addition and scalar multiplication operations is not a vector space because * O We can find two polynomials P(x) and Q(x) for which P(x)-Q(x)#Q(x)-P(x) O It is not closed under addition. O We can find a polynomial P(x) for which 1-P(x)#P(x) O We can find a polynomial P(x) such that (c+d)P(x)#cP(x)+dP(x).

The set of all polynomials of degree 4 under the standard addition and scalar multiplication operations is not a vector space because * O We can find two polynomials P(x) and Q(x) for which P(x)-Q(x)#Q(x)-P(x) O It is not closed under addition. O We can find a polynomial P(x) for which 1-P(x)#P(x) O We can find a polynomial P(x) such that (c+d)P(x)#cP(x)+dP(x).

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Concept explainers

Linear Algebra

In mathematics, problems can be solved by the arithmetic operators like addition, subtraction, multiplication, and division. In algebra, we represent the numbers by any letter called a variable. If these variables are of degree 1, then it is studied under linear algebra. The first-degree equations involving algebraic expressions are called linear equations. That is, if you represent it by drawing a graph you will get a straight line.

Question

The set of all polynomials of degree 4 under the standard addition and scalar multiplication
operations is not a vector space because *
O We can find two polynomials P(x) and Q(x) for which P(x)-Q(x)#Q(x) P(x)
O It is not closed under addition.
O We can find a polynomial P(x) for which 1-P(x)#P(x)
O We can find a polynomial P(x) such that (c+d)P(x)#cP(x)+dP(x).

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