1001 Algebra Problems.PDF

358. d.
     (2 – 3x^3 ) – [(3x^3 + 1) – (1 – 2x^3 )]
     = 2 – 3x^3 – [3x^3 + 1 – 1 + 2x^3 ]
     = 2 – 3x^3 – [5x^3 ]
     = 2 – 3x^3 – 5x^3
     = 2 – 8x^3


359. b.The degree of a polynomial is the highest
     power to which the variable xis raised. For the
     polynomial –5x^8 + 9x^4 – 7x^3 – x^2 , the term
     involving the highest power ofxis –5x^8 , so the
     degree of the polynomial is 8.


360. c.For the polynomial –^32 x+ 5x^4 – 2x^2 + 12,
     the term involving the highest power ofxis
     5 x^4 , so the degree of the polynomial is 4.


361. a.A constant polynomial is of the form cx^0 =
     c,where cis a constant. By this definition, the
     degree of the constant polynomial 4 is zero.


362. c.By definition, a polynomial is an expression
     of the form anxn+ an–1xn–1+ ... + a 1 x+ a 0
     where a 0 ,a 1 , ...,anare real numbers and nis a
     nonnegative integer. Put simply, once the
     expression has been simplified, it cannot
     contain negative powers of the variablex.
     Therefore, the expression x– 3x–2is not a
     polynomial.


363. c.A polynomial is an expression of the form
     anxn+ an–1xn–1+ ... + a 1 x+ a 0 ,where a 0 ,a 1 , ...,
     anare real numbers and nis anonnegative
     integer. That is, once the expression has been
     simplified, it cannot contain negative powers
     of the variablex. If we simplify the expression
     (–2x)–1– 2 using the exponent rules, we obtain

- ^12 x–1– 2, which cannot be a polynomial

because of the term –^12 x–1. Note that the

expression given in choice aisa polynomial;

the coefficients, not the variable, involve nega-

tive exponents. The expression in choice bis a

polynomial for similar reasons; note that the

first term is really just a constant since x^0 = 1.

364. d.The statements in choices a,b, and care all
     true, and follow from the fact that simplifying
     such arithmetic combinations of polynomials
     simply involves adding and subtracting the
     coefficients of like terms. Note also that, by
     definition, a trinomialis a polynomial with
     three terms and a binomialis a polynomial
     with two terms.


365. a.In general, dividing one polynomial by
     another will result in an expression involving a
     term in which the variable is raised to a nega-
     tive power. For instance, the quotient of even
     the very simple polynomials 3 and x^2 is x^32 =
     3 x–2, which is not a polynomial.


366. b.
     –(–2x^0 )–3+ 4–2x^2 – 3–1x– 2
     = –(–2)–3+ x^2 – ^13 x– 2

= – + x^2 – ^13 x– 2

= – –^1  8 +  116 x 2 – ^13 x– 2

= 116 x^2 – ^13 x– ^185 

367. d.

- (2 – (1 – 2x^2 – (2x^2 – 1)))– (3x^2 – (1 – 2x^2 ))

= –(2 – (1 – 2x^2 – 2x^2 + 1))– (3x^2 – 1 + 2x^2 )

= –(2 – (2 – 4x^2 ))– (5x^2 – 1)

= –(2 – 2 + 4x^2 ) – (5x^2 – 1)

= –4x^2 – 5x^2 + 1

= –94x2 + 1

^1

42

^1

(–2)^3

^1

42

ANSWERS & EXPLANATIONS–