The curve under one's foot refers to the arch, which is a critical component of the foot's structure. The arch helps distribute body weight evenly, provides support during walking and running, and absorbs shock. It consists of several bones, ligaments, and tendons that work together to maintain balance and stability. Proper arch support is essential for overall foot health and can impact posture and alignment.
the arch of your foot
The area under the normal curve is ALWAYS 1.
The are under the curve on the domain (a,b) is equal to the integral of the function at b minus the integral of the function at a
In statistics you can find the area under a curve to establish what to expect between two input numbers. If there is a lot of area under the curve the graph is tall and there is a higher probability of things occurring there than when the graph is low.
To find the area under the standard normal curve between -1.33 and the mean (0), we can use the standard normal distribution table or a calculator. The area to the left of -1.33 is approximately 0.0918. Since the total area under the curve is 1 and the curve is symmetrical around the mean, the area between -1.33 and 0 is about 0.5 - 0.0918 = 0.4082. Thus, the area under the curve from -1.33 to the mean is approximately 0.4082.
use the inside of your foot and hit the ball slightly to one side and mak sure your foot is also under the ball. It will be hard at first but will get easier after practising
The area under the standard normal curve is 1.
the arch of your foot
If this is on mymaths.co.uk then the answer to this question is: Integration. That is how to find the area under the curve.
The area under the normal curve is ALWAYS 1.
WORK
the standard normal curve 2
If the values of the function are all positive, then the integral IS the area under the curve.
There is no histogram below.However, the area under the curve for any histogram is the total frequency.
the heel
If the question is to do with a probability distribution curve, the answer is ONE - whatever the values of mu and sigma. The area under the curve of any probability distribution curve is 1.
The are under the curve on the domain (a,b) is equal to the integral of the function at b minus the integral of the function at a