The range of the function g(x) = csc(2x + 1) is given by Select one: O...
5. Determine the range of the function given by g(x)= (m)_J 2x+1 51 |-x+5 x >1 (A) (-0,4] (B) (-0,3] (C) (-0,3) (D) (-0,4) (E) (-0,0)
Question 19 Complete the identity. CSC X cotx = ? sec x O A. sec? x O B. csc? x OC. 1 OD. cot? x Click to select your answer.
Find the range of the function f(x) = x2 A) (0,0) B)[0,00) C)(1,0) D)(-1,00) E)-, -1] U [0,0] F)RUR G)(1,0) H) (1,-1] Select one: a. F b. C C. B d. H e. D f. E g. A h. G
This Question: 1 pt -1 The function f(x) = 5 + 1 is one-to-one. (a) Find the inverse off and check the answer (b) Find the domain and the range of fandf (a) f(x)=0 (Simplify your answer) (b) Find the domain off. Select the correct choice below and, if necessary, fill in the answer box to complete your cho O A. The domain is {xIx*} OB. The domain is {xlxs) OC. The domain is {xlx2 OD. The domain is the...
If f'(x) = (x – 7)(x-1), the function f(x) is increasing on: Select one: O a. (-0,1) O b. (-1,0) O c. (-0,7) O d. (7,00) O e. (-1,7)
Determine the domain of each of the functions P(x), Q(x), V(x), and Z(x). Select the one row that gives the correct domain underneath each function. P(x)= x2 + 1 Q(x) = Ne + 1 V(r) = **1 Z(x) = log (x + 1) OP: [-1, )Q: (-00, -1) (-1,00) V:(-0,0) Z: (-1,00) OP: (-00,00) Q: (-1,0) V: (-00, -1) (-1,0) Z: (-1,00) OP: (-00,00) Q: (-1,-) V: (-0, -1) U (-1,00) Z: (-1,0) OP: (-0, -1) U (-1,0) Q: (-1,-)...
Is fa probability density function? Explain. f(x) = 2 + 2x if - 1 sxs0 0 otherwise Select the correct choice below and, if necessary, fill in the answer box to complete your choice. OA. No, since I w f(x) dx = 00 OB 00 Yes, since s flex) dx = 1 00 Oc. Yes, since f(x) 2 0 for all xEV-00, 0o) and f(x) dx = 1. 00 OD. No, since f(x) <0 for some xe- 00, ).
Q 5 Q Use interval notation to identily the domain and range for the function O A Domain -00, 0), Range - 60,-2.25) B. Domain -2.25...), Range -00,00) OC. Domain-0000) Range 2 25.00 OD Domain -00,-2.25), Range (-0,00) TE
FIND THE SOLUTION TO THE FOLLOWING INEQUALITY X + 4 = x2 + 2 = 2X + 10 A) (-2,-2) U [4,00) B) (-2,4) C)(-0,-1) U (2.c) D)(-1,2) E)(-0,2] F)(-1,0) G)(-0,–2] U [4,6) H)[-2, -1] [2,4) Select one: a. D b. F C. A d. G e. C f. H g. B h. E
- 2x Find the values of x at which the function f(x)=e + 2x has a relative maximum or minimum point. O A. minimum at x = 0 OB 0.69 maximum at x = 2 O C. There are no relative maximum/minimum points. OD maximum at x- O E. none of these Click to select your answer