Q&A

Why did we need a limit to calculate the slope of the tangent line?

Why did we need a limit to calculate the slope of the tangent line?

Limits tell us how functions behave at x→a, not how they behave at x=a.

What is the meaning of limit delta x tends to zero?

Delta x tends to zero is used when the difference b/w to values is approximately zero or very small. It can also be written dx or dy for denoting small values.

Why is it delta y over delta X?

Δy / Δx, can be interpreted as meaning a quotient of small differences in y and x. The quotient is the answer to a division problem [1]. For example, in the problem 10 / 5, 2 is the quotient.. dy/dx means derivative and you can’t interpret it as a quotient of two numbers dy and dx.

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Is the limit the slope of the tangent line?

The slope of a line tangent to a minimum or maximum is always 0, so our slope is zero.

How significant is the concept of limits and slope of tangent line to derivative?

Since the derivative is defined as the limit which finds the slope of the tangent line to a function, the derivative of a function f at x is the instantaneous rate of change of the function at x. It also does not have any points with verticle slope.

How is a limit related to a tangent?

The slope of the line tangent to the graph of y=f(x) at the point (a,f(a) can be stated in more than one way, but all involve limits: The slope of the line tangent to the graph of y=f(x) at the point (a,f(a) is: limx→af(x)−f(a)x−a (if the limit exists).

What happens when delta x is zero?

When delta X is zero, there will be no change.

Can Delta X negative?

Delta Notation It is just a prefix indicating a change in the quantity t. For the mundane events that we shall be discussing, time always goes forward and Δt is always positive. And, unlike time, it can change both ways so Δx can be either positive or negative.

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What does zero slope look like?

Put simply, a zero slope is perfectly flat in the horizontal direction. The equation of a line with zero slope will not have an x in it. It will look like ‘y = something.’

How is the derivative related to the slope of the tangent line to a curve at a point?

A tangent line is a straight line that touches a function at only one point. The tangent line represents the instantaneous rate of change of the function at that one point. The slope of the tangent line at a point on the function is equal to the derivative of the function at the same point (See below.)

Who is first credited with using m for slope?

Matthew O’Brien
The earliest known use of m for slope is an 1844 British text by Matthew O’Brien entitled _A Treatise on Plane Co-Ordinate Geometry_ [V. Frederick Rickey]. George Salmon (1819-1904), an Irish mathematician, used y = mx + b in his _A Treatise on Conic Sections_, which was published in several editions beginning in 1848.

What does the slope of the tangent line mean?

The slope of the tangent line is the instantaneous rate of change . Figure 3. The slope of the tangent line through a point on the graph of a function gives the function’s instantaneous rate of change at that point. Suppose that . (a) Find the average rate of change of with respect to over the interval .

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How do you find the tangent line on a curved graph?

Log in here. The tangent line to a curve at a given point is the line which intersects the curve at the point and has the same instantaneous slope as the curve at the point. Finding the tangent line to a point on a curved graph is challenging and requires the use of calculus; specifically, we will use the derivative to find the slope of the curve.

What is the slope of the curve at the point P?

The slope of a curve y = f(x) at the point P means the slope of the tangent at the point P. We need to find this slope to solve many applications since it tells us the rate of change at a particular instant. [We write y = f(x) on the curve since y is a function of x.

What is the slope of the secant line on the graph?

The slope of the secant line is the average rate of change . Figure 2. The slope of the secant line through two points on the graph of a function gives the function’s average rate of change over the interval. Figure 3 shows through the point on the . The slope of the tangent line is the instantaneous rate of change .