Finding Gradients from Graphs

• Finding the gradient of a graph at a point gives us an indication of how steep the "hill" is at that point, representing the rate at which one variable changes in relation to another.

 

The Concept of a Gradient

The gradient of a line (or slope) indicates how much $y$ changes for a small change in $x$. In the context of curves, the gradient at a point essentially tells us the steepness of the tangent to the curve at that point. It's defined as the ratio of the rise (change in $y$) over the run (change in $x$).

 

Steps to Finding Gradients for Curved Graphs

1. Draw a Tangent Line: At the point of interest on the curve, draw a straight line that just touches the curve without crossing it. This is your tangent line.
2. Select Two Points: Choose two points on this tangent line, ideally as far apart as possible without straying too far from the point of interest, to maintain accuracy.
3. Calculate the Change: Measure the vertical change ($y$) and the horizontal change ($x$) between these two points.
4. Determine the Gradient: Use the formula $\text{Gradient} = \frac{\Delta y}{\Delta x}$ to calculate the approximate gradient.

 

 

Tips for Accurate Estimations

• Accuracy of the Tangent: The accuracy of your gradient estimation heavily depends on how accurately you can draw the tangent. Use a ruler and take your time.
• Choosing Points: Picking points that fall exactly on the grid lines can simplify the calculation of $\Delta y$ and $\Delta x$.