Which statement about gradient calculations is true?

• A. They are calculated the same way, but expressed differently
• B. They are calculated differently and expressed the same
• C. One cannot compare them at all
• D. Gradient only applies to elevation, not distance

Answer: (A)

Gradients describe how a quantity changes per unit of another quantity, and the way you calculate them is the same across contexts: measure the change in the dependent variable and divide by the change in the independent variable. The result is a rate of change that can be expressed in different forms depending on how you present it—such as a simple ratio, a percent slope, or an angle. For example, a rise of 50 units over a run of 200 units yields a gradient of 0.25, which is 25% or about 14 degrees when converted. This shows why the statement that they are calculated the same way but expressed differently is the best description. The idea that gradient is limited to elevation, or that you can’t compare gradients or must compute them differently in different contexts, isn’t accurate.