c^2 = a^2 + b^2
c = sqrt(a^2 + b^2) = sqrt(40^2 + 81^2) = sqrt(8161) = 90 inches
9.4 yards i think
The two candidates are 300 and 400 300 is a "distance" of 49 away 400 is a "distance" of 51 away So 300 is the nearest 100.
You can't calculate that, since you don't know how many miles she drove, and there is not information to figure it out.
We're missing a value, we'll need the distance traveled to determine that.
Points: (6, 5) and (-3, -8) Distance: 15.81 to the nearest hundredth
You are an avid skateboarder and just skated down a ramp. You want to find the distance you traveled. The height of the ramp at its tallest part is 40 inches and the horizontal length is 81 inches. Calculate the distance, to the nearest whole inch, you traveled down the ramp.
82.4 in
9.4 yards i think
The two candidates are 300 and 400 300 is a "distance" of 49 away 400 is a "distance" of 51 away So 300 is the nearest 100.
The answer is 0.33
2669m
That depends on what kind of route you traveled, and how fast you traveled. No space craft ever travels in a straight line. But since that's the shortest route to anywhere, let's assume that you could travel a straight route to the nearest star. Then the distance would be 4.4 light-years, or about 25,870,000,000,000 miles. -- If you traveled at the speed of light, it would take you 53 months. -- If you traveled at 1 million mph, you'd pass the moon in 14 minutes, and arrive at the nearest star in 671 years. -- If you traveled at 60 mph so as to avoid speeding tickets, you'd reach the nearest star in a little over 11 million years.
First you need to calculate the work required. This is simply force x distance in this case.Once you have that, divide the work by the time.
You can't calculate that, since you don't know how many miles she drove, and there is not information to figure it out.
We're missing a value, we'll need the distance traveled to determine that.
Calculate (to the nearest 0.1 u) carbon dioxide, CO2
The light year is a unit of distance, used in connection with the distribution of astronomical objects throught space. It's defined as the distance traveled by light through vacuum in one year, and when rounded, is roughly equal to 5,878,600,000,000 miles. The distance to the nearest star outside the solar system is about 4.3 light years.