Using the formula for the speed of a shallow-water wave, C = square root (g x d), what is the speed of a wave when d = 10 meters. The value of g = 10 m/s2.
Oh, I see you want to dive into the depths of physics with me! Well, if the depth is 10 meters and the gravitational acceleration is 10 m/s², then according to the formula C = √(g × d), we can calculate the speed of the wave with a gentle splash. So, let's plug in the numbers:
C = √(10 m/s² × 10 m)
C = √(100 m²/s²)
C = 10 m/s
Voila! The speed of the wave in this deep dive is a cool 10 meters per second. Just be sure to wear your swim cap!
To find the speed of a wave when the depth (d) is 10 meters and the acceleration due to gravity (g) is 10 m/s^2, we can use the formula C = √(g x d).
Plugging in the given values, we have:
C = √(10 x 10)
C = √100
C = 10 m/s
So, the speed of the wave when d = 10 meters is 10 m/s.
To find the speed of a wave using the formula C = √(g × d), where C represents the speed of the wave, g is the acceleration due to gravity, and d is the depth of the water, you can follow these steps:
1. Replace the given values in the formula: C = √(10 m/s^2 × 10 m).
2. Multiply the values inside the square root: C = √(100 m²/s²).
3. Take the square root of 100: C = 10 m/s.
Therefore, the speed of the wave when the depth is 10 meters is 10 m/s.