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Rational equations | Polynomial and rational functions | Algebra II | Khan Academy

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    Solve the equation and
    find excluded values.
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    And what they're talking about,
    about finding excluded values,
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    is we need to think about what
    values would make these either
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    side of this equation undefined.
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    And the reason why
    we want to do that
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    is because as we
    manipulate this,
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    we might lose things
    in the denominator.
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    And then we might
    get some answer.
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    But if it's one of
    those things that
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    made the original, the original
    expressions, or either side
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    of the original
    equation undefined
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    then that wouldn't be
    a legitimate solution.
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    So that's what they're talking
    about, the excluded values.
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    So what values do we have
    to exclude here right
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    from the get go?
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    Well 4 over p minus
    1 won't be defined
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    if p is 1 because if p is
    1, then this, then you're
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    going to be dividing by 0.
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    And that's undefined.
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    So we know that p
    cannot be equal to 1.
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    And over here, if p
    was at negative 3,
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    then this denominator would be
    0 and it would be undefined.
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    And so p cannot be equal
    to 1 or negative 3.
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    So these right here are
    our excluded values.
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    So now let's try to solve.
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    Let's try to solve
    this equation.
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    And I'm going to
    rewrite it over here.
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    So we have 4 over p minus 1
    is equal to 5 over p plus 3.
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    So the first thing we
    could do, especially
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    because we can assume now that
    neither of these expressions
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    are 0.
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    And this is going to
    be defined, since we've
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    excluded these values of
    p, is to get the p minus 1
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    out of the denominator.
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    We can multiply the left
    hand side by p minus 1.
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    But remember, this
    is an equation.
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    If you want them to
    continue to be equal,
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    anything you do
    left hand side, you
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    have to do to the
    right hand side.
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    So I'm multiplying by p minus 1.
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    Now I also want to get this p
    plus 3 out of the denominator
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    here on the right hand side.
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    So the best way to do that is
    multiply the right hand side
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    by p plus 3.
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    But if I do that to
    the right hand side,
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    I also have to do that
    to the left hand side.
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    p plus 3.
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    And so what happens?
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    We have a p minus 1 in
    the numerator, p minus 1
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    at the denominator.
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    These cancel out.
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    So you have just a 1
    of the denominator,
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    or you have no
    denominator anymore.
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    And the left hand
    side simplifies
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    to 4 times p plus
    3, or if you were
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    to distribute the
    4, 4 times p plus 3.
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    So that is 4p plus 12.
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    And then the right
    hand side, you
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    have plus 3 canceling
    with a p plus 3.
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    This is p plus 3
    divided by p plus 3.
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    And all you're left with
    is 5 times p minus 1.
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    If you distribute the
    5 you get 5p minus 5.
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    And now this is a pretty
    straightforward linear equation
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    to solve.
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    We just want to isolate
    the p's on one side
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    and the constants on the other.
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    So let's subtract
    5p from both sides.
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    I'll switch colors.
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    So let's subtract
    5p from both sides.
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    And we get on the
    left hand side,
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    4p minus 5p is
    negative p plus 12.
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    Is equal to, these cancel
    out, is equal to negative 5.
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    And then we could subtract
    12 from both sides.
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    And we get, these cancel out,
    we get negative p is equal to,
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    negative 5 minus
    12 is negative 17.
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    And we're almost done.
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    We can multiply both
    sides by negative 1
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    or divide both
    sides by negative 1
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    depending on how
    you want to view it.
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    And we get, negative
    one times negative p is.
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    So let me just scroll
    down a little bit
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    so I have a little
    bit of real estate.
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    That's positive
    p is equal to 17.
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    p is equal to 17.
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    And let's verify that
    this really works.
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    Well, it wasn't one of our
    excluded values, but just
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    in case, let's verify
    that it really works.
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    If we go, if we have p is 17.
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    We get 4 over 17 minus 1,
    needs to be equal to 5 over 17
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    plus 3.
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    I'm just putting 17 in for p,
    because that's our solution.
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    So this is the same
    thing as 4 over 16,
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    needs to be the same
    thing as 5 over 20.
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    Or 4/16 is the
    same thing as 1/4,
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    and that needs to be
    the same thing as 5/20,
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    which is the same thing as 1/4.
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    So it all checks out.
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    So these are excluded values.
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    And lucky for us, this
    wasn't one of them.
Title:
Rational equations | Polynomial and rational functions | Algebra II | Khan Academy
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Video Language:
English
Team:
Khan Academy
Duration:
04:16

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