26) Let f(x)=x4−1x2−1 for x≠−1,1 .
a. Sketch the graph of f .
b. Is it possible to find values k1 and k2 such that f(−1)=k and f(1)=k2 , and that makes f(x) continuous for all real numbers? Briefly explain.
27) Sketch the graph of the function y=f(x) with properties i. through vii.
i. The domain of f is ( −∞,+∞ ).
ii. f has an infinite discontinuity at x=−6 .
iii. f(−6)=3
iv. limx→−3−f(x)=limx→−3+f(x)=2
v. f(−3)=3
vi. f is left continuous but not right continuous at x=3 .
vii. limx→−∞f(x)=−∞ and limx→+∞f(x)=+∞
Answer:
D = 286°
Step-by-step explanation:
Find both the angles of each right triangle.
Triangle A : 53°, 37°, 90°
180° - 127° = 53°
53° + 90° = 143°
180° - 143° = 37°
Triangle B: 90°, 53°, 37°
180° - 127° = 53°
53° + 90° = 143°
180° - 143° = 37°
Now, we find <em>w.</em>
<em>w</em> = 180° - 37° = 143°
<em>r </em>= 2<em>w</em> = 143 × 2
<em>r</em> = 286°
It’s the last one! Hope this helps
Answer: The 24 pack of 16 Oz.
Step-by-step explanation: It is much more for a cheaper price
For this case we must solve the following equation:
Subtracting 2 from both sides of the equation we have:
Equal signs are added and the same sign is placed.
Multiplying by 4 on both sides of the equation we have:
Thus, the solution of the equation is
Answer: