4 If g(x) = –3x + 2, determine g(-2). A-4 B 8 Drag the red circle...
6 If g(x) = 5x2 +1, determine g(3). A 16 B 3 Drag the red circle to choose your answer. C 46 D-5 monto 2020 FoucAvse Sotware Inc. All rights reserved
3 If f(x) = x - (x + 3), what is the value of f(12)? A-3 B 12 Drag the red circle to choose your answer. C 24 D 4 o yright 2020 EducAlde Software Inc. All rights reserved
2 If the formula is used to find a certain population of animals, p(n) = -2(n – 5) + 6, then find p(5) A 5 Drag the red circle to choose your answer. B6 C-14 D-4 yright 2020 EducAide Software Inc. All rights reserved notes
5 The function g(x) is defined as g(x) = 2x² + 3. The value of g(4) is A 35 Drag the red circle to choose your answer. B 27 19 D 45 ht2020 Educide Software inc. All rights reserved notes
7 If k(x) = 3x – x, then k(6) is A 18 B 3 Drag the red circle to choose your answer C 12 D 15 O
Determine whether the function is a polynomial function. If it is, identify the degree. F(x) = 2x2 + 5** Choose the correct choice below and, if necessary, fill in the answer box to complete your choice. A. It is a polynomial. The degree of the polynomial is B. It is not a polynomial > ary Ons Click to select and enter your answers) and then click Check Answer All parts showing CA Copyright 2020 Pearson Education Inc. All rights reserved....
18. Let f(x) 4x2 +1 and gox)- 3x-4. Find (f+g)x), (f - g)(x). (I eg)X<), and (x). Determine the domain of seros d (t+g)0x)= (Simplify your answer. Do not factor.) 0o.o (Simplify your answer. Do not factor) = (x6-) (g)x) (Simplify your answer. Do not factor.) swer. Do not factor.) (Simplify your (x)= Choose the correct domain of B. All real numbers 1 A. All real numbers except t D. All real numbers except 4/3 C. All real numbers except...
3x +5 8. Find the inverse of the function g(r)- 4 -1 a.3 g" (x)=4x+5 4 b. g()-3x5 4x-5 -1 (x)= 4 d, g-i(x) = 3x +5
1 If f(x) = 4x + 5, what is the value of f(2)? A-2 B 13 Drag the red circle to choose your answer. C 17 D4 O
A3.1. Given a function (g(x)=\begin{cases} \dfrac{3x^2+4x-4}{3x-2}, { x \neq \dfrac{2} {3} \\ \\ \dfrac{8}{3}, & x = \dfrac{2}{3} \end{cases} V). Check whether it is continuous at \( x = \dfrac{2}{3} V) and justify your answer with necessary steps.