Mat QS

1.  

            Multiply the first fraction by  , and multiply the second fraction by , to get:

            Since the two fractions now have the same denominator, the numerators can be     combined:

            This fraction cannot be reduced any further.

2.         The quotient of two real numbers with different signs is

3.         Simplify the following expression:

            Move the variables with the negative exponents to the opposite side of the             fraction bar, and change those exponents from negative to positive. This gives:

            Combine like terms in the numerator and the denominator to get:

            Squaring all of the terms in the numerator and the denominator then gives:

4.         Graph the following equation:

            Substituting x = 0 into the equation gives:

            The point (0, 2) will be one point on the graph of this line.

            Substituting x = 3 into the equation gives:

            The point (3, 4) will be another point on the line.

            Plot the two points and connect with a solid line. The graph looks like this:

5.         What are the equation and slope of the y-axis?

            The y-axis is a vertical line, so its slope is

            All of the points on the y-axis have an x coordinate of 0, so the equation of the      line is

6.         Given f(x) = 2x – 8, find f(3).

            Substitute 3 in place of x to get:

7.         Solve the following inequality. Give each result in set notation and graph it:

            Dividing through by 3 gives:

            Simplifying then gives:

            The solution in set notation is

            The graph looks like this:

8.         Solve the following inequality. Write the solution in interval notation and graph it.

            Convert the inequality into a compound inequality:

            Subtracting 4 from each part gives:

            Dividing through by 2 then gives:

            The solution in interval notation is

            The graph of the solution set looks like this:

9.         Simplify the following product.

            Distributing the -2t³u term through the parentheses gives:

10.       Simplify the following expression fully:

            Multiplying the numerator and the denominator by ab gives:

            Simplifying the terms then gives:

11.       Solve the equation 7(x + 5) = x – 1

            Distribute the coefficient of 7 on the left side:

            Subtract x from both sides:

            Subtract 35 from both sides:

            Divide both sides by 6:

12.       Completely factor the following expression: 16m⁴ – 1.

            This is the difference of two squares, a² – b², and can be factored as (a + b)(a – b).

            The last factor on the right side is another difference of two squares, and can also be factored:

            The complete factorization is then:

13.       Write the numeral 0.0072 in scientific notation.

            Move the decimal three places to the right, so that it follows the first non-zero       digit:

            Then, since the decimal point was moved three places to the right, add an   exponent of -3:

14.       Perform the indicated operation and simplify completely.

            The numerator of the first fraction can be factored as:
            The denominator of the second fraction can be factored as:

            Substituting these into the expression gives:

            Cancelling the (x – 5) terms from the numerator and the denominator gives:

            Cancelling a y from the numerator and the denominator gives:

            Finally, dividing 6 by 2 leaves:

15.       Solve the following equation for r:     d = rt

            Dividing both sides by t gives:

16.       Solve the system of equations given below.

                        3x + y = 12

                        x – y – 2z = 10

                        2x + 3y + 5z = -7

            Solving the first equation for y gives:

            Substituting this in place of y in the second equation gives:

            Substituting for x and y in the third equation gives:

            Substituting for x again then gives:

            Expanding terms and simplifying gives:

            Multiplying through by 2 gives:

            With the value of z known, the value of x can be determined:

            Then, with the value of x known, the value of y can be determined:

17.       Do the following two lines intersect? Answer yes or no, together with the point of             intersection, if any.

                        5x + 6y = -5.5

                        6x + 1.5y = -8.5

            Rearranging the first equation into y = mx + b form gives:

            Rearranging the second equation into the same form gives:

            The slope of the first line is -5/6. The slope of the second line is -4. Since the

            slopes of the two lines are different, the two lines will intersect at some point.

            Setting the right of each equation equal gives:

            Multiplying through by 12 then gives:

            Adding 11 to both sides gives:

            Substituting this into one of the two equations for y gives:

18.       Compute the determinant:

19.       Compute the distance between the two points   and  

20.       Rationalize the denominator of  

            To rationalize the denominator, multiply both numerator and denominator by the   conjugate of the denominator:

            Multiplying the fractions and simplifying gives:

21.       The volume (V) of a cylinder with radius (r) and height (h) is given by V = πr²h.

            Solve this formula for r.