b.1
c.2
d.3
e.4
10001, being an odd number, cannot be expressed as the sum of two prime numbers following the Goldbach's conjecture in mathematics. Hence, the answer is 0 ways.
The question asks in how many ways can 10001 be written as the sum of two primes. This question relates to the concept of Goldbach's conjecture in mathematics, which states that any even integer greater than 2 can be written as the sum of two primes. Since 10001 is an odd number and greater than 2, the conjecture doesn't apply, hence there isn't any way to represent 10001 as the sum of two prime numbers. So, the answer is option a. 0.
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A: 18 units
B: 9 units
C:27 units
D: 81 units
Answer:
b:9 units
Step-by-step explanation:
The given equation represents a circle. The square root of 81 (which is 9) is the radius of this circle and hence denotes the range of the cellular phone tower. So, the range of the cell phone tower is 9 units.
The given equation models a circle where (x-5)² and (y-7)² are the squared coordinates of the circle, and 81 is the square of the radius of the circle. The radius represents the range of the cellular tower in this case. The radius (or range, in this context) is the square root of 81 which is 9 units. Therefore, the range of the cell phone tower is 9 units.
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1. 17/25
2. 1/40
3. 21/25
4. 2/125
5. 1/125
6. 7/10
7. 13/40
8. 743/1000
9. 14/25
10. 11/100
good luck :) I hope this helped you!
V=(4/3)(pi)r^3
r=7.5
V=(4/3)(pi)(7.5^3)
V=(4/3)(pi)(7.5^3)
V=(4/3)(pi)(421.875)
V=562.5pi ft^2
if you watnt to you can aprox pi=3.14
V=562.5*3.14
V=1766.25 ft^3