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Condition |
free/or 0.5$ |
| m67884 | Determine the coordinates of the maximum point on the revenue graph. Round to the nearest hundredth.
A company is interested in producing and selling a new device called an eyePOD (eyewear personal optical device). The eyePOD is an MP3 and video player built into a pair of sunglasses. The user can listen to music from the small earphones and watch videos projected on the screen behind the glasses. |
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| m67888 | Determine the degree and the leading term of the polynomial function.
a) f(x) = (x5 - 1)2 (x2 + 2)3
b) f(x) = (10 - 3x5)2 (5 - x4)3 (x + 4) |
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| m67889 | Determine the distance covered by a car traveling 55 km/h for each unit and time given. Round answers to the nearest unit.
a. Kilometers in one hour
c. Meters in one minute
b. Meters in one hour
d. Meters in one second |
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| m67890 | Determine the distance covered by a car traveling 68 mi/h for each unit and time given. Round answers to the nearest unit.
a. Miles in one hour
c. Feet in one minute
b. Feet in one hour
d. Feet in one second |
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| m67891 | Determine the distance covered by a car traveling 80 km/h for each unit and time given. Round answers to the nearest unit.
a. Kilometers in one hour
c. Meters in one minute
b. Meters in one hour
d. Meters in one second |
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| m67892 | Determine the distance covered by a car traveling x km/h for each unit and time given.
a. Kilometers in one hour
c. Meters in one minute
b. Meters in one hour
d. Meters in one second |
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| m67893 | Determine the domain and the range of the function. |
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| m67894 | Determine the domain and the range of the function.
(a)
(b)
(c) |
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| m67895 | Determine the domain and the range of the piecewise function. Then write an equation for the function.
(a)
(b)
(c) |
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| m67896 | Determine the domain of the function
A. (- (, 2) ( (2, 3) ( (3, ()
B. (- (, - 3) ( (- 3, 1) ( (1, ()
C. (- (, 2) ( (3, ()
D. (- (, - 3) ( (1, () |
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| m67897 | Determine the domain of the function.
a.
b.
c. |
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| m67901 | Determine the horizontal asymptote of the graph of the function.
a.
b.
c. |
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| m67902 | Determine the intervals on which the function is (a) increasing, (b) decreasing, and (c) constant.
1.
2. |
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| m67903 | Determine the intervals on which the function is (a) increasing; (b) decreasing; (c) constant. |
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| m67904 | Determine the intervals on which the function is (a) increasing, (b) decreasing, and (c) constant.
(1)
(2) |
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| m67905 | Determine the intervals on which the function is
(a) increasing
(b) decreasing
(c) constant. |
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| m67906 | Determine the leading term, the leading coefficient, and the degree of the polynomial. Then classify the polynomial function as constant, linear, quadratic, cubic, or quartic?
a) g(x) = 1/23 x3 - 10x + 8
b) f(x) = 15x2 - 10 + 0.11x4 - 7x3
c) h(x) = 0.9 x - 0.13 |
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| m67907 | Determine the leading term, the leading coefficient, and the degree of the polynomial. Then describe the end behavior of the function s graph and classify the polynomial function as constant, linear, quadratic, cubic, or quartic.
a) g(x) = - x3 - 2x2
b) f(x) = - x2 - 3x + 6
c) f(x) = - 4/9? |
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| m67908 | Determine the leading term, the leading coefficient, and the degree of the polynomial. Then classify the polynomial function as constant, linear, quadratic, cubic, or quartic?
1. f (x) = 7x2 - 5 + 0.45x4 - 3x3
2. h(x) = - 25
3. g(x) = 6 - 0.5x |
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| m67909 | Determine the leading term, the leading coefficient, and the degree of the polynomial. Then classify the polynomial as constant, linear, quadratic, cubic, or quartic.
a. f (x) = 2x3 + 6x2 - x4 + 11
b. h(x) = -4.7x + 29
c. Find the zeros of the polynomial function and state the multiplicity of each:
f(x) = x(3x - 5) (x - 3)2 (x + 1)3. |
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