the momentum would be 27.44 kg*m/s
the work done by the ball is given by the equation, W=mgh =(5)(9.8)(8) =392 joules.
200 degrees Centigrade or Celsius: 9/5*(200)+32 = 392 degrees Fahrenheit
What planet are you on? I don't mean to be a wise-ass, but weight depends upon the acceleration of gravity, which is different on different planets, whereas mass is the same no matter where you are. On the surface of the Earth, the acceleration due to gravity is 9.8 m/s2, so a 40-kg mass will weigh 40 x 9.8 = 392 newtons.
PE=mgh Potential Energy = mass x gravity x height. PE=(5kg) x (9.8 m/s2) x (8m) which is the equation when you put the things you know into the right places. Gravity is the missing number, and that equals 9.8 m/s2PE = mghPE = (5 kg)(9.8 m/s2)(8 m)PE = (5 kg)(78.4 m2/s2)PE = 392 kg m2/s2 or 392 joulesThis block can perform 392 joules of work.
Assuming you're on Earth, the barrel weighs 392 N.
392 more or less
300-450, there are usually 392 on pro golf tours
There are six factor pairs: 392 = 1 x 392 392 = 2 x 196 392 = 4 x 98 392 = 7 x 56 392 = 8 x 49 392 = 14 x 28
The pro v 1 392 was an early version of the pro v 1, I think it may even have been a wound ball. The current pro v 1 is touted as the best yet, it also has 392 dimples. The pro v 1 392 was retired about 6 or 7 years ago.
the work done by the ball is given by the equation, W=mgh =(5)(9.8)(8) =392 joules.
They are called dimples and there are between 300-450. On a Titleist Pro V 1 there are 392 dimples.
392 56 x 7 = 392
392^3 = 60,236,288.
392
√392 = ~19.8
√392 ~= 19.799
Yes. 19.7989 is the square root of 392. But 392 is not a perfect square.