Understanding Tangents and Secants

Find the derivative

Determine the y-intercept

Calculate the area under the curve

Identify the x-intercept

It is equal to the y-coordinate

It is always zero

It is the same as the x-coordinate

It is defined by the derivative at that point

It is the area under the curve

It defines the gradient

It represents the y-intercept

It is the x-coordinate of the point

It increases

It decreases

It becomes undefined

It remains constant

To simplify the calculation of the area

To find the x-intercept

To determine the maximum value of the function

To collect like terms and simplify the equation

A tangent is a special type of chord

A chord is always perpendicular to a tangent

A tangent is the limit of a secant

A chord is the derivative of a tangent

It describes the point where a secant becomes a tangent

It determines the slope of a normal

It calculates the area between two curves

It defines the maximum length of a chord

A line that intersects a curve at two points

A line that is parallel to the tangent

A line that is perpendicular to the normal

A line that is tangent to the curve

It is identical to the tangent

It is parallel to the tangent

It has a gradient of minus one over the tangent's gradient

It uses the same gradient

It becomes identical to the tangent

It results in a neat gradient-intercept form

It involves a multiplication of p to eliminate fractions

It remains in its original form