Square root of 512k^2. show work
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Related Questions
Which two numbers add up to 5 and multiply to -45 ?
A book sold 38.400 copies in its first month of release. Suppose this represents 7.3% of the number of copies sold todate. How many copies have been sold to date?Round your answer to the nearest whole number
The spoke of a wheel reaches from the center of the wheel to its rim. If the circumference of the rim of the wheel is 27 inches, how long is each spoke? Round your answer to the nearest hundredth.
Each participant in a certain study was assigned a sequence of 3 different letters from the set {a, b, c, d, e, f, g, h}. if no sequence was assigned to more than one participant and if 36 of the possible sequences were not assigned, what was the number of participants in the study? (note, for example, that the sequence a, b, c is different from the sequence c, b,a.) 20
b) stretched horizontally, moved 3 to the right and 4 up
c) reflected with respect to x-axis, stretched vertically, moved 3 to the right and 4 up
d) stretched horizontally, moved 3 to the left and 4 down
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Hope it helps!!
driven. What is the total cost of renting the car for
5 days and driving 350 miles?
(Note: No sales tax is involved.)
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The total cost of renting the car for 5 days and driving 350 miles = 249.75
How to calculate total cost?
- Average cost (the total cost of a unit of output divided by the number of units produced) and marginal cost are classified by total cost (the marginal cost of a given unit of output is the increase in the total cost required to produce that unit).
- Production, for example, has a direct impact on raw material costs. The total cost, on the other hand, is the sum of the total fixed and variable costs.
- It is denoted as TC (total cost). Total Cost (TC) is calculated by combining the two. Total cost is the total of all costs incurred by a company in producing a specific level of output.
Therefore,
5 × 30 = 150
28 × 350 = 9975
9975 cents = 99.75
Then,
99.75 + 150 = 249.75
Hence, The total cost of renting the car for 5 days and driving 350 miles = 249.75
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Answer Choices:
All real numbers except 11
x > 11
All real numbers
x ≤ 11
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Answer:
Option D, x ≤ 11
Step-by-step explanation:
We have to determine the domain of the function.
f(x) =
This function is defined for the positive values of ( 11 - x ) because under root of negative terms is not defined.
Therefore, domain of the given function will be ( 11 - x ) ≥ 0
x ≤ 11
Option D, x ≤ 11 is the answer.
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Hope this helps :)
8 6 10
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The probability that the flight would be delayed when it is not raining is 12.15%.
Since at LaGuardia Airport, for a certain nightly flight, the probability that it will rain is 0.19 and the probability that the flight will be delayed is 0.15, while the probability that it will not rain and the flight will leave on time is 0.74 , to determine what is the probability that the flight would be delayed when it is not raining, the following calculation must be performed:
- Probability that it will not rain = 1 - probability that it will rain
- X = 1 - 0.19
- X = 0.81
- Probability that the flight would be delayed when it is not raining = probability that it is not raining x probability that the flight will be delayed
- X = 0.81 x 0.15
- X = 0.1215
- 0.1215 x 100 = 12.15
Therefore, the probability that the flight would be delayed when it is not raining is 12.15%.
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Final answer:
To find the probability that the flight would be delayed when it is not raining, we can use conditional probability. The probability that the flight will be delayed given that it is not raining can be calculated using the formula: P(delayed | not raining) = P(delayed and not raining) / P(not raining). We are given the values for these probabilities and can calculate the answer as approximately 0.914.
Explanation:
To find the probability that the flight would be delayed when it is not raining, we can use conditional probability. The probability that the flight will be delayed given that it is not raining can be calculated using the formula:
P(delayed | not raining) = P(delayed and not raining) / P(not raining)
We are given that P(delayed and not raining) = 0.74 and P(not raining) = 1 - 0.19 = 0.81. Substituting these values into the formula:
P(delayed | not raining) = 0.74 / 0.81 ≈ 0.914. Therefore, the probability that the flight would be delayed when it is not raining is approximately 0.914.
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