Calculus Derivative problem?

I'm new to calculus and derivatives and such. I can do the easy ones like:

4 - x^2

but I don't know how to do ones that involve fractions:

( 1 - X ) / ( 2 * Z )

Do I take the fraction out and find its derivative like this:

1 / ( 2 * Z) = 2z^ -1 = -2z^-2

After that I have no clue where to go withe rest of the derivative. Can someone help me please?

Update:

Sorry. I was changing the variables in the problem to be X's, so all the z's in the problem SHOULD be x's.

Comments

  • y = (1 - x) / 2x

    y = (1 / 2x) - (x / 2x)

    y = (1/2)x^(-1) - 1/2

    dy/dx = -(1/2)x^(-2)

    dy/dx = -1 / 2x²

  • for (1-x)/(2x), I'd suggest rewriting it as two terms:

    (1/2)x^(-1) - 1/2, ...now take derivative

    [use power rule for first, constant rule for second]

    (1/2)(-1)x^(-2) - 0

    simplify

    -1/(2x²)

    OR, use the "quotient rule" if it has been introduced.

  • if you ask this

    (1-x)/2x then you split this in 2 fractions 1/2x- x/2x so you get (1/2x)' - 2' so

    (1/2x)' = 1/2 ((x)^-1 )'= 1/2(x)^-2 *(-1) = -1/2 x^(-2)

    second way to do it is to use formula for fractions (here is easier to do it on first way cause you can shorten the expresion (x /2x))

    second way formula

    f(x)/g(x) = [f(x)'*g(x) - f(x)*g(x)']/g(x)^2

  • Use the product rule for products,

    y=f(x)*g(x)

    y'=f(x)*g'(x)+g(x)*f'(x)

    .

    .

    Use the quotient rule for quotients,

    y'=(g(x)*f'(x)-f(x)g'(x))/(g(x))^2

    .

    .

    f(x)=1-x

    g(x)=2x

    f'(x)=-1

    g'(x)=2

    Using the quotient rule,

    y=(1-x)/2x

    y'=(2x(-1)-(1-x)2)/(4x^2)=(-2x-2+2x)/4x^2=(-2)/4x^2=-1/(2x^2)

    .

    .

    You could also have simplified first too,

    y=(1-x)/2x=1/(2x)-1/2=(2x)^(-1)-1/2

    y'=(-1)(2x)^(-2)*(2)

    y'=-2/(4x^2)=-1/(2x^2)

    Same answer but quicker maybe.

  • There are two ways to work problems with fractions.

    Method 1: use the product rule or the quotient rule, and then simplify.

    d/dx (f(x) * g(x)) = f(x)g'(x) + g(x)f'(x)

    d/dx (1-x)(0.5x^-1) = (1-x)(-0.5x^-2) + (0.5x^ -1)(-1)

    = (x-1) / (2x^2) - 1/(2x)

    = -1 / (2x^2)

    Method 2: simplify first and then use d/dx (f(x) + g(x)) = d/dx f(x) + d/dx g(x).

    d/dx (1-x)(0.5x^-1) = d/dx (0.5x^-1 - 0.5)

    = d/dx (0.5x^-1) + d/dx (-0.5)

    = -0.5x^-2

    = -1 / (2x^2)

  • (1-x)/(2x)

    =(1-x)*(2x)^-1

    using chain rule to derive:

    [(1-x)*-1(2x)^-2*2] + [(2x)^-1*-1] <=first*d(second) + second*d(first)

    simplify

    -2(1-x)/4x^2 + -1/2x

    get common denominator and add fractions

    -2-2x+2x/4x^2

    =-2/4x^2

    =-1/2x^2

  • f = (1-x)/2x

    = 1/2x - 1/2

    f' = -1/2x^2

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