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in the earlier section we solved equations which contained absolute values in this section we desire to look at inequalities which contain
example solve following 10 x - 3 0 solutionlets approach this
solve following 2x -
in the last two sections of this chapter we desire to discuss solving equations amp inequalities that have absolute values we will look at
in this section we are going to solve inequalities which involve rational expressions the procedure for solving rational inequalities is closely
examples of polynomial that doesnt factornow all of the examples that weve worked to this point comprised factorable polynomials however that
now it is time to look at solving some more hard inequalities in this section we will be solving single inequalities which involve polynomials of
solve out following inequalities give both inequality amp interval notation forms for the solution -14 lt -7 3x 2 lt
now lets solve out some double inequalities the procedure here is alike in some ways to solving single inequalities and still very different in other
solving the following inequalities give both inequality and interval notation forms of the solution-2 m - 3 lt 5 m 1 -12solutionsolving out
we will begin with inequalities that only have a single inequality in them the thing that weve got to keep in mind here is that were asking to
we have to give one last note on interval notation before moving on to solving inequalities always recall that while we are writing down an interval
the following is a double the following is a double
to this instance in this chapter weve concentrated on solving out equations now it is time to switch gears a little amp begin thinking regarding
the title of this section is perhaps a little misleading the title appears to imply that were going to look at equations which involve any
solve 2 x10 - x5 - 4 0 solutionwe can reduce this to quadratic in form using the substitutionu x5u 2 x10by using this substitution the
solve the equation x4 - 7 x2 12 0solutionnow lets start off here by noticing
in this section we are going to look at equations which are called quadratic in form or reducible to quadratic in form what it means is that we will
we are going to fence into a rectangular field amp we know that for some cause we desire the field to have an enclosed area of 75 ft2 we also know
in this section were going to revisit some of the applications which we saw in the linear applications section amp see some instance which will
in the earlier two sections weve talked quite a bit regarding solving quadratic equations a logical question to ask at this point is which method
solve a quadratic equation through completing the squarenow its time to see how we employ completing the square to solve out a quadratic equation the
complete the square on each of the following x2
completing the squarethe first method well learning at in this section is completing the square this is called it since it uses a procedure called
in the earlier section we looked at using factoring amp the square root property to solve out quadratic equations the problem is that both of these