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The formula for pH is pH = -log[H+]. The formula for slope is m = (y2 -y1)/(x2 - x1)
Rate;Rate of change;Slope
If the position is graphed vs time, then the slope (rate of change of position with respect to time) will be the same (parallel).
point-slope formula and finding the slope of the line.
How does slope affect the rate of weathering
slope formula is the answer
Yes, Rate of change is slope
it is the same as the slope, which can be found either graphically (rise over run) or algebraically using the formula (y2-y1)/(x2-x1)
The rate of change is the same as the slope.
The slope of a line is the change of the y(vertical) axis over the x(horizontal) axis. It is the rate. In the formula y=ax+b the a is the slope.
For continuous functions, yes.
They are the same for a straight line but for any curve, the slope will change from point to point whereas the average rate of change (between two points) will remain the same.
The instantaneous rate change of the variable y with respect to x must be the slope of the line at the point represented by that instant. However, the rate of change of x, with respect to y will be different [it will be the x/y slope, not the y/x slope]. It will be the reciprocal of the slope of the line. Also, if you have a time-distance graph the slope is the rate of chage of distance, ie speed. But, there is also the rate of change of speed - the acceleration - which is not DIRECTLY related to the slope. It is the rate at which the slope changes! So the answer, in normal circumstances, is no: they are the same. But you can define situations where they can be different.
Well slope intercept form is y=mx+b and slope equation can be the same formula, except it might be interpreted in a different way. although, i may be wrong.
it is the slope formula in the equation it is the slope formula in the equation
Depends. Slope of tangent = instantaneous rate of change. Slope of secant = average rate of change.
The slope of a linear function is also a measure of how fast the function is increasing or decreasing. The only difference is that the slope of a straight line remains the same throughout the domain of the line.