To find out how far 490 joules will raise a block weighing 7 newtons, we can use the formula for gravitational potential energy: [ \text{Potential Energy} (PE) = \text{weight} \times \text{height} ] Rearranging this gives us: [ \text{height} = \frac{PE}{\text{weight}} ] Substituting the values: [ \text{height} = \frac{490 \text{ J}}{7 \text{ N}} = 70 \text{ m} ] Thus, 490 joules will raise the block 70 meters.
To find how far 490 joules of energy will raise a block weighing 7 newtons, you can use the formula for gravitational potential energy: ( \text{Potential Energy} = \text{Weight} \times \text{Height} ). Rearranging this gives ( \text{Height} = \frac{\text{Potential Energy}}{\text{Weight}} ). Substituting the values, ( \text{Height} = \frac{490 , \text{J}}{7 , \text{N}} = 70 , \text{m} ). Therefore, 490 joules will raise the block 70 meters.
To find out how far 350 J of energy will raise a 7 kg block, we can use the formula for gravitational potential energy: ( PE = mgh ), where ( PE ) is potential energy, ( m ) is mass, ( g ) is the acceleration due to gravity (approximately 9.81 m/s²), and ( h ) is the height. Rearranging the formula to solve for height gives us ( h = \frac{PE}{mg} ). Substituting in the values, we have ( h = \frac{350 , \text{J}}{7 , \text{kg} \times 9.81 , \text{m/s}^2} \approx 5.1 , \text{m} ). Therefore, 350 J will raise the block approximately 5.1 meters.
In a city, a standard city block is typically about 1/8 of a mile, or approximately 660 feet. Therefore, 500 feet is roughly three-quarters of a city block. However, the exact distance can vary depending on the specific layout of the city.
To find the height a block can be raised using 490 J of work, we can use the formula for work: ( W = F \cdot d ), where ( W ) is work, ( F ) is force (weight of the block), and ( d ) is the distance (height raised). Rearranging the formula gives ( d = \frac{W}{F} ). Substituting the values, we have ( d = \frac{490 , \text{J}}{7 , \text{N}} = 70 , \text{m} ). Therefore, the block can be raised 70 meters.
The work done on the block is 350 J, which can be used to raise the block against gravity. Work done = force x distance. So, distance raised = work done / force = 350 J / 7 N = 50 meters.
To find out how far 490 joules will raise a block weighing 7 newtons, we can use the formula for gravitational potential energy: [ \text{Potential Energy} (PE) = \text{weight} \times \text{height} ] Rearranging this gives us: [ \text{height} = \frac{PE}{\text{weight}} ] Substituting the values: [ \text{height} = \frac{490 \text{ J}}{7 \text{ N}} = 70 \text{ m} ] Thus, 490 joules will raise the block 70 meters.
To find how far 490 joules of energy will raise a block weighing 7 newtons, you can use the formula for gravitational potential energy: ( \text{Potential Energy} = \text{Weight} \times \text{Height} ). Rearranging this gives ( \text{Height} = \frac{\text{Potential Energy}}{\text{Weight}} ). Substituting the values, ( \text{Height} = \frac{490 , \text{J}}{7 , \text{N}} = 70 , \text{m} ). Therefore, 490 joules will raise the block 70 meters.
660 feet = 0.125 miles
To find out how far 350 J of energy will raise a 7 kg block, we can use the formula for gravitational potential energy: ( PE = mgh ), where ( PE ) is potential energy, ( m ) is mass, ( g ) is the acceleration due to gravity (approximately 9.81 m/s²), and ( h ) is the height. Rearranging the formula to solve for height gives us ( h = \frac{PE}{mg} ). Substituting in the values, we have ( h = \frac{350 , \text{J}}{7 , \text{kg} \times 9.81 , \text{m/s}^2} \approx 5.1 , \text{m} ). Therefore, 350 J will raise the block approximately 5.1 meters.
In a city, a standard city block is typically about 1/8 of a mile, or approximately 660 feet. Therefore, 500 feet is roughly three-quarters of a city block. However, the exact distance can vary depending on the specific layout of the city.
To find the height a block can be raised using 490 J of work, we can use the formula for work: ( W = F \cdot d ), where ( W ) is work, ( F ) is force (weight of the block), and ( d ) is the distance (height raised). Rearranging the formula gives ( d = \frac{W}{F} ). Substituting the values, we have ( d = \frac{490 , \text{J}}{7 , \text{N}} = 70 , \text{m} ). Therefore, the block can be raised 70 meters.
Though it varies (for example 10th, 11th, and 12th streets on the NW/SW quadrants are quite close together), on average, one DC city block is about one-tenth of a mile.
about 660 miles
"Furlow" is not a unit of measure. A "furlong" is a length of 660 ft.
As far as you push it.
As far as I know its on the block in a plastic housing As far as I know its on the block in a plastic housing