How do you rationalize a function?

Under what situation do you attempt to rationalize?

When you have a two part numerator or denominatior, you put the numerator or denominator over itself, then change the conjugate (the sign that makes it a two part) and multiply it by the original function.

You attempt to rationalize when straight substitution gives you a meaningless result.

f`(x)= [image]

The slope of the tangent line at a given point IS found by using the derivative.

It can give you the slope value of the tangent line. Only slope value. It won't give you the whole equation of the line. That is why you do derivative first. It equals M (see point slope formula).

This is used in rate of change problems.

Ex.

Find the slope of the tangent line.

Write the equation for the tangent line at that point.

f(x)=5x⁵+3x²-2x-5

function: f(x)=5x⁵+3x²+(-2x)+(-5)

derivative f(x)=25x⁴+6x-2+0

                                  sum of the derivatives

Once you have a function writen as a sum of terms, the derivative beecomes the sum of the DERIVATIVE OF THE TERMS.

What is the chain Rule?

What does it allow us to accomplish?

If y=f(u) is a defferentiable function of u and u=g(x) is a differentiable function of x, then

y=f(g(x)) is a differentiable function of x and

dy/dx = dy/du*du/dx

OR

d/dx[f(g(x))] = f'(g(x)) g'(x)

Don't change inside

The Chain Rule allows us to differentiate composite functions.

The derivative of the natural logarithm function is the reciprocal function.

When

f (x) = ln(x)

The derivative of f(x) is:

f ' (x) = 1 / x

Logarithm power rule

log_b(x ^y) = y ∙ log_b(x)

For example:

log₁₀(2⁸) = 8 ∙ log₁₀(2)

Chain Rule: The derivative of a function of u with respect to x is the derivative of the function with respect to u times the derivative of u with respect to x.

[image]

log_b(x / y) = log_b(x) - log_b(y)

For example:

log₁₀(3 / 7) = log₁₀(3) - log₁₀(7)

Derivative of natural logarithm

f (x) = ln(x)

The derivative of f(x) is:

f ' (x) = 1 / x