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\documentclass{article} %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% %TCIDATA{OutputFilter=LATEX.DLL} %TCIDATA{Created=Tuesday, June 03, 2003 13:53:07} %TCIDATA{LastRevised=Wednesday, June 04, 2003 16:21:06} %TCIDATA{} %TCIDATA{} %TCIDATA{CSTFile=Exam.cst} %TCIDATA{PageSetup=72,72,36,36,0} %TCIDATA{PlotRng2DRectangular=0,-10,10,49} %TCIDATA{ComputePlot2DSettings=0,Line,Solid,Thin,Dot,[flat::RGB:0000000000],Normal,0} \input{tcilatex} \begin{document} \section{Exam} \subsection{Text} \section{Basic Concepts} \subsubsection{A Random Quiz} Name: %TCIMACRO{\HTML{}}% %BeginExpansion %% %EndExpansion \subsection{Setup} Choices: No Break, Radio, Permute Question space: 2 Print Choices: (a), (b), (c), (d) Submit: Click here to check your answers. Title: Competency Exam \section{Question} \subsection{Statement} $\vspace{1pt}$Simplify: $7+3\cdot 6\div 3\cdot 4-3$ \subsection{Choices} \begin{itemize} \item $\frac{11}{2}$ \item $28\correctchoice{}$ \item $20$ \item $77$ \end{itemize} \section{Question} \subsection{Statement} Simplify: $25-(7)^{2}\div (14-7)\cdot 13$ \subsection{Choices} \begin{itemize} \item $234$ \item $-66\correctchoice{}$ \item $-\frac{312}{7}$ \item $\frac{318}{13}$ \end{itemize} \section{Question} \subsection{Statement} Simplify: $\left| -11\right| +\left| 18\right| -\left| 13\right| $ \subsection{Choices} \begin{itemize} \item $42$ \item $6$ \item $16\correctchoice{}$ \item $-20$ \end{itemize} \section{Question} \subsection{Statement} Simplify: $-2\left\lceil -5\left( y+7\right) +y\right\rceil $ \subsection{Choices} \begin{itemize} \item $-8y-70$ \item $8y+70\correctchoice{}$ \item $-12y-70$ \item $8y-70$ \end{itemize} \vspace{1pt} \section{Question} \subsection{Statement} Evaluate the given expression when w = -3 $-2w^{2}+2w-3$ \subsection{Choices} \begin{itemize} \item -21 \item -27$\correctchoice{}$ \item -15 \item -9 \end{itemize} \section{Question} \subsection{Statement} $\vspace{1pt}$Solve for q: $-4\left( -5q+2\right) =8q-5$ \subsection{Choices} \begin{itemize} \item q=$\frac{1}{4}\correctchoice{}$ \item q=$-\frac{13}{28}$ \item q=$-\frac{13}{12}$ \item q=$\frac{3}{28}$ \end{itemize} \section{Question} \subsection{Statement} Solve for r: $\frac{7}{2}r+3=\frac{3}{8}$ \subsection{Choices} \begin{itemize} \item $r=-\frac{147}{16}$ \item $r=-\frac{3}{4}\correctchoice{}$ \item $r=0$ \item $r=\frac{27}{28}$ \end{itemize} \section{Question} \subsection{Statement} Solve for v: $u=3y-6v$ \subsection{Choices} \begin{itemize} \item $v=-\frac{1}{6}u-\frac{1}{2}y$ \item $v=-\frac{1}{6}u+3y$ \item $v=-\frac{1}{6}u+\frac{1}{2}y\correctchoice{}$ \item $v=-\frac{1}{6}u-3y$ \end{itemize} \section{Question} \subsection{Statement} If 9 times a number is increased by 20, the result is 22 less than the square of the number. \ Choose the equation that could be used to find this number, x. \subsection{Choices} \begin{itemize} \item $9(x+20)=x^{2}-22$ \item $29x=x^{2}-22$ \item $9x+20=22-x^{2}$ \item $9x+20=x^{2}-22\correctchoice{}$ \end{itemize} \section{Question} \subsection{Statement} The length of a rectangle is 6 feet more than the width. \ The perimeter of the rectangle is 56 feet. \ Find the length. \subsection{Choices} \begin{itemize} \item 31 feet \item 17 feet$\correctchoice{}$ \item 11 feet \item 25 feet \end{itemize} \section{Question} \subsection{Statement} Identify the proportion listed below that solves this problem: If 27 pounds of jely beans cost 60 cents, how many pounds of jelly beans can be produced for 169 cents? \subsection{Choices} \begin{itemize} \item $\frac{27}{x}=\frac{169}{60}$ \item $\frac{27}{169}=\frac{60}{x}$ \item $\frac{169}{x}=\frac{60}{27}\correctchoice{}$ \item $\frac{60}{27}=\frac{x}{169}$ \end{itemize} \section{Question} \subsection{Statement} Simplify: $(a^{2}b^{4})^{2}(a^{8}b^{5})$ \subsection{Choices} \begin{itemize} \item $a^{9}b^{8}$ \item $a^{4}b^{8}$ \item $a^{12}b^{13}\correctchoice{}$ \item $a^{4}b^{13}$ \end{itemize} \section{Question} \subsection{Statement} Simplify: $\frac{x^{7}y^{0}z^{7}}{x^{5}y^{7}z^{3}}$ \subsection{Choices} \begin{itemize} \item $x^{2}y^{7}z^{4}$ \item $\frac{1}{x^{2}y^{7}z^{4}}$ \item $\frac{x^{2}}{y^{7}z^{4}}$ \item $\frac{x^{2}z^{4}}{y^{7}}\correctchoice{}$ \end{itemize} \section{Question} \subsection{Statement} Simplify: $\left( y^{3}x^{0}\right) ^{-8}$ \subsection{Choices} \begin{itemize} \item $y^{24}$ \item $y^{11}x^{8}$ \item $\frac{1}{y^{24}}\correctchoice{}$ \item $\frac{1}{y^{5}x^{8}}$ \end{itemize} \section{Question} \subsection{Statement} Covert to scientific notation: $1,640,000$ \subsection{Choices} \begin{itemize} \item $1.64\times 10^{6}\correctchoice{}$ \item $0.164\times 10^{7}$ \item $1.64\times 10^{-6}$ \item $1.64\times 10^{7}$ \end{itemize} \section{Question} \subsection{Statement} Simplify: $(7x^{2}+4x-7)-(2x^{2}-6x+5)$ \subsection{Choices} \begin{itemize} \item $5x^{2}+10x-2$ \item $5x^{2}-2x-12$ \item $5x^{2}-2x-2$ \item $5x^{2}+10x-12\correctchoice{}$ \end{itemize} \section{Question} \subsection{Statement} Simplify: $-8x(-6x+6)$ \subsection{Choices} \begin{itemize} \item $48x^{2}-48x\correctchoice{}$ \item $-48x^{2}-48x$ \item $48x^{2}+48x$ \item $0$ \end{itemize} \section{Question} \subsection{Statement} Simplify: $(9x+6)(-9x-2)$ \subsection{Choices} \begin{itemize} \item $-81x^{2}-72x-12\correctchoice{}$ \item $-81x^{2}+72x-12$ \item $-81x^{2}-36x-12$ \item $81x^{2}-72x-12$ \end{itemize} \section{Question} \subsection{Statement} Factor completely: $36y^{30}v^{8}+20y^{15}v^{16}+48y^{21}v^{4}$ \subsection{Choices} \begin{itemize} \item $4yv(9y^{29}v^{7}+5y^{14}v^{15}+12y^{20}v^{3})$ \item $4y^{3}v^{2}(9y^{10}v^{4}+5y^{5}v^{8}+12y^{7}v^{2})$ \item $4y^{14}v^{3}(9y^{16}v^{5}+5yv^{13}+12y^{7}v)$ \item $4y^{15}v^{4}(9y^{15}v^{4}+5v^{12}+12y^{6})\correctchoice{}$ \end{itemize} \section{Question} \subsection{Statement} Factor: $25s^{2}-144z^{2}$ \subsection{Choices} \begin{itemize} \item $(5s-12z)(5s+12z)\correctchoice{}$ \item $(5s+4z)(5s-36z)$ \item $(5s-12z)^{2}$ \item $(5s+36z)(5s-4z)$ \end{itemize} \section{Question} \subsection{Statement} Factor Completely: $9y^{2}-12ys+3y-4s$ \subsection{Choices} \begin{itemize} \item $(3y+s)(3y-4)$ \item $(3y-1)(3y-4s)$ \item $(3y+1)(3y-4s)\correctchoice{}$ \item $(3y+1)(3y+4s)$ \end{itemize} \section{Question} \subsection{Statement} Identify a factor of the following trinominal: $6r^{2}-23r-4$ \subsection{Choices} \begin{itemize} \item $(6r+1)\correctchoice{}$ \item $(3r-2)$ \item $(r+1)$ \item $(r-1)$ \end{itemize} \section{Question} \subsection{Statement} Solve: $x^{2}+4x+3=0$ \subsection{Choices} \begin{itemize} \item $x=-1,$ \ \ $x=-3\correctchoice{}$ \item $x=1,$ \ \ \ \ $x=3$ \item $x=1,$ \ \ \ \ $x=-3$ \item $x=-1,$ \ $x=3$ \end{itemize} \section{Question} \subsection{Statement} Simplify: $\frac{3x^{2}-7x-6}{12x^{2}+5x-2}$ \subsection{Choices} \begin{itemize} \item $\frac{x-1}{4x-1}$ \item $\frac{x-3}{2x+1}$ \item $\frac{x-3}{4x-1}\correctchoice{}$ \item $\frac{x+3}{4x-1}$ \end{itemize} \section{Question} \subsection{Statement} Solve: $2x^{2}+x-21=0$ \subsection{Choices} \begin{itemize} \item $x=-3,$ $\ \ x=\frac{7}{2}$ \item $x=3,$ $\ \ \ \ x=\frac{7}{2}$ \item $x=3,$ $\ \ \ \ x=-\frac{7}{2}\correctchoice{}$ \item $x=-\frac{1}{3},$ $\ x=-\frac{7}{2}$ \end{itemize} \section{Question} \subsection{Statement} Simplify completely: $2\sqrt{64x^{9}u^{2}}$ \subsection{Choices} \begin{itemize} \item $128ux^{4}\sqrt{x}$ \item $16ux^{4}\sqrt{x}\correctchoice{}$ \item $16u\sqrt{x^{9}}$ \item $128ux^{4}\sqrt{x^{9}}$ \end{itemize} \section{Question} \subsection{Statement} Simplify: $\sqrt{4}\left( 5\sqrt{20}-\sqrt{4}\right) $ \subsection{Choices} \begin{itemize} \item $14\sqrt{5}$ \item $20\sqrt{5}-4\correctchoice{}$ \item $5+6\sqrt{5}$ \item $30\sqrt{5}$ \end{itemize} \section{Question} \subsection{Statement} Solve the inequality: $19x+4\leq 51x+1$ \subsection{Choices} \begin{itemize} \item $x\geq -\frac{3}{32}$ \item $x\leq -\frac{3}{32}$ \item $x\geq \frac{3}{32}\correctchoice{}$ \item $x\leq \frac{3}{32}$ \end{itemize} \section{Question} \subsection{Statement} Find the y-intercept for: $-2x-7y=3$ \subsection{Choices} \begin{itemize} \item $\left( 0,-\frac{3}{7}\right) \correctchoice{}$ \item $\left( -\frac{3}{2},0\right) $ \item $\left( 0,-\frac{3}{2}\right) $ \item $\left( -\frac{3}{2},-\frac{3}{7}\right) $ \end{itemize} \section{Question} \subsection{Statement} Find the graph that best matches the given linear equation: $y=4x+3$ \subsection{Choices} \begin{itemize} \item \FRAME{dtbpFX}{3in}{2in}{0in}{}{}{Plot}{\special{language "Scientific Word";type "MAPLEPLOT";width 3in;height 2in;depth 0in;display "USEDEF";plot_snapshots FALSE;mustRecompute FALSE;lastEngine "Maple";xmin "-10";xmax "10";xviewmin "-10.4";xviewmax "10.408";yviewmin "-44.6";yviewmax "38.632";plottype 4;numpoints 49;plotstyle "patch";axesstyle "normal";xis \TEXUX{x};var1name \TEXUX{$x$};function \TEXUX{$4x-3\QTO{correctchoice}{\correctchoice{}}$};linecolor "black";linestyle 1;pointstyle "point";linethickness 1;lineAttributes "Solid";var1range "-10,10";num-x-gridlines 49;curveColor "[flat::RGB:0000000000]";curveStyle "Line";}} \item \FRAME{dtbpFX}{3in}{2in}{0in}{}{}{Plot}{\special{language "Scientific Word";type "MAPLEPLOT";width 3in;height 2in;depth 0in;display "USEDEF";plot_snapshots FALSE;mustRecompute FALSE;lastEngine "Maple";xmin "-10";xmax "10";xviewmin "-10.4";xviewmax "10.408";yviewmin "-44.6";yviewmax "38.632";plottype 4;numpoints 49;plotstyle "patch";axesstyle "normal";xis \TEXUX{x};var1name \TEXUX{$x$};function \TEXUX{$-4x-3$};linecolor "black";linestyle 1;pointstyle "point";linethickness 1;lineAttributes "Solid";var1range "-10,10";num-x-gridlines 49;curveColor "[flat::RGB:0000000000]";curveStyle "Line";}} \item \FRAME{dtbpFX}{3in}{2in}{0in}{}{}{Plot}{\special{language "Scientific Word";type "MAPLEPLOT";width 3in;height 2in;depth 0in;display "USEDEF";plot_snapshots FALSE;mustRecompute FALSE;lastEngine "Maple";xmin "-10";xmax "10";xviewmin "-10.4";xviewmax "10.408";yviewmin "-38.6";yviewmax "44.632";plottype 4;numpoints 49;plotstyle "patch";axesstyle "normal";xis \TEXUX{x};var1name \TEXUX{$x$};function \TEXUX{$-4x+3$};linecolor "black";linestyle 1;pointstyle "point";linethickness 1;lineAttributes "Solid";var1range "-10,10";num-x-gridlines 49;curveColor "[flat::RGB:0000000000]";curveStyle "Line";}} \item $\correctchoice{}$\FRAME{dtbpFX}{3in}{2in}{0in}{}{}{Plot}{% \special{language "Scientific Word";type "MAPLEPLOT";width 3in;height 2in;depth 0in;display "USEDEF";plot_snapshots FALSE;mustRecompute FALSE;lastEngine "Maple";xmin "-10";xmax "10";xviewmin "-10.4";xviewmax "10.408";yviewmin "-38.6";yviewmax "44.632";plottype 4;numpoints 49;plotstyle "patch";axesstyle "normal";xis \TEXUX{x};var1name \TEXUX{$x$};function \TEXUX{$4x+3$};linecolor "black";linestyle 1;pointstyle "point";linethickness 1;lineAttributes "Solid";var1range "-10,10";num-x-gridlines 49;curveColor "[flat::RGB:0000000000]";curveStyle "Line";}} \end{itemize} \end{document}

\documentclass{article} %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% %TCIDATA{OutputFilter=LATEX.DLL} %TCIDATA{Created=Tuesday, June 03, 2003 13:53:07} %TCIDATA{LastRevised=Wednesday, June 04, 2003 16:15:41} %TCIDATA{} %TCIDATA{} %TCIDATA{CSTFile=Exam.cst} %TCIDATA{PageSetup=72,72,36,36,0} %TCIDATA{PlotRng2DRectangular=0,-10,10,49} %TCIDATA{ComputePlot2DSettings=0,Line,Solid,Thin,Dot,[flat::RGB:0000000000],Normal,0} \input{tcilatex} \begin{document} \section{Exam} \subsection{Text} \section{Basic Concepts} \subsubsection{A Random Quiz} Name: %TCIMACRO{\HTML{}}% %BeginExpansion %% %EndExpansion \subsection{Setup} Choices: No Break, Radio, Permute Question space: 2 Print Choices: (a), (b), (c), (d) Submit: Click here to check your answers. Title: Competency Exam \section{Question} \subsection{Statement} $\vspace{1pt}$Simplify: $7+3\cdot 6\div 3\cdot 4-3$ \subsection{Choices} \begin{itemize} \item $\frac{11}{2}$ \item $28\correctchoice{}$ \item $20$ \item $77$ \end{itemize} \section{Question} \subsection{Statement} Simplify: $25-(7)^{2}\div (14-7)\cdot 13$ \subsection{Choices} \begin{itemize} \item $234$ \item $-66\correctchoice{}$ \item $-\frac{312}{7}$ \item $\frac{318}{13}$ \end{itemize} \section{Question} \subsection{Statement} Simplify: $\left| -11\right| +\left| 18\right| -\left| 13\right| $ \subsection{Choices} \begin{itemize} \item $42$ \item $6$ \item $16\correctchoice{}$ \item $-20$ \end{itemize} \section{Question} \subsection{Statement} Simplify: $-2\left\lceil -5\left( y+7\right) +y\right\rceil $ \subsection{Choices} \begin{itemize} \item $-8y-70$ \item $8y+70\correctchoice{}$ \item $-12y-70$ \item $8y-70$ \end{itemize} \vspace{1pt} \section{Question} \subsection{Statement} Evaluate the given expression when w = -3 $-2w^{2}+2w-3$ \subsection{Choices} \begin{itemize} \item -21 \item -27$\correctchoice{}$ \item -15 \item -9 \end{itemize} \section{Question} \subsection{Statement} $\vspace{1pt}$Solve for q: $-4\left( -5q+2\right) =8q-5$ \subsection{Choices} \begin{itemize} \item q=$\frac{1}{4}\correctchoice{}$ \item q=$-\frac{13}{28}$ \item q=$-\frac{13}{12}$ \item q=$\frac{3}{28}$ \end{itemize} \section{Question} \subsection{Statement} Solve for r: $\frac{7}{2}r+3=\frac{3}{8}$ \subsection{Choices} \begin{itemize} \item $r=-\frac{147}{16}$ \item $r=-\frac{3}{4}\correctchoice{}$ \item $r=0$ \item $r=\frac{27}{28}$ \end{itemize} \section{Question} \subsection{Statement} Solve for v: $u=3y-6v$ \subsection{Choices} \begin{itemize} \item $v=-\frac{1}{6}u-\frac{1}{2}y$ \item $v=-\frac{1}{6}u+3y$ \item $v=-\frac{1}{6}u+\frac{1}{2}y\correctchoice{}$ \item $v=-\frac{1}{6}u-3y$ \end{itemize} \section{Question} \subsection{Statement} If 9 times a number is increased by 20, the result is 22 less than the square of the number. \ Choose the equation that could be used to find this number, x. \subsection{Choices} \begin{itemize} \item $9(x+20)=x^{2}-22$ \item $29x=x^{2}-22$ \item $9x+20=22-x^{2}$ \item $9x+20=x^{2}-22\correctchoice{}$ \end{itemize} \section{Question} \subsection{Statement} The length of a rectangle is 6 feet more than the width. \ The perimeter of the rectangle is 56 feet. \ Find the length. \subsection{Choices} \begin{itemize} \item 31 feet \item 17 feet$\correctchoice{}$ \item 11 feet \item 25 feet \end{itemize} \section{Question} \subsection{Statement} Identify the proportion listed below that solves this problem: If 27 pounds of jely beans cost 60 cents, how many pounds of jelly beans can be produced for 169 cents? \subsection{Choices} \begin{itemize} \item $\frac{27}{x}=\frac{169}{60}$ \item $\frac{27}{169}=\frac{60}{x}$ \item $\frac{169}{x}=\frac{60}{27}\correctchoice{}$ \item $\frac{60}{27}=\frac{x}{169}$ \end{itemize} \section{Question} \subsection{Statement} Simplify: $(a^{2}b^{4})^{2}(a^{8}b^{5})$ \subsection{Choices} \begin{itemize} \item $a^{9}b^{8}$ \item $a^{4}b^{8}$ \item $a^{12}b^{13}\correctchoice{}$ \item $a^{4}b^{13}$ \end{itemize} \section{Question} \subsection{Statement} Simplify: $\frac{x^{7}y^{0}z^{7}}{x^{5}y^{7}z^{3}}$ \subsection{Choices} \begin{itemize} \item $x^{2}y^{7}z^{4}$ \item $\frac{1}{x^{2}y^{7}z^{4}}$ \item $\frac{x^{2}}{y^{7}z^{4}}$ \item $\frac{x^{2}z^{4}}{y^{7}}\correctchoice{}$ \end{itemize} \section{Question} \subsection{Statement} Simplify: $\left( y^{3}x^{0}\right) ^{-8}$ \subsection{Choices} \begin{itemize} \item $y^{24}$ \item $y^{11}x^{8}$ \item $\frac{1}{y^{24}}\correctchoice{}$ \item $\frac{1}{y^{5}x^{8}}$ \end{itemize} \section{Question} \subsection{Statement} Covert to scientific notation: $1,640,000$ \subsection{Choices} \begin{itemize} \item $1.64\times 10^{6}\correctchoice{}$ \item $0.164\times 10^{7}$ \item $1.64\times 10^{-6}$ \item $1.64\times 10^{7}$ \end{itemize} \section{Question} \subsection{Statement} Simplify: $(7x^{2}+4x-7)-(2x^{2}-6x+5)$ \subsection{Choices} \begin{itemize} \item $5x^{2}+10x-2$ \item $5x^{2}-2x-12$ \item $5x^{2}-2x-2$ \item $5x^{2}+10x-12\correctchoice{}$ \end{itemize} \section{Question} \subsection{Statement} Simplify: $-8x(-6x+6)$ \subsection{Choices} \begin{itemize} \item $48x^{2}-48x\correctchoice{}$ \item $-48x^{2}-48x$ \item $48x^{2}+48x$ \item $0$ \end{itemize} \section{Question} \subsection{Statement} Simplify: $(9x+6)(-9x-2)$ \subsection{Choices} \begin{itemize} \item $-81x^{2}-72x-12\correctchoice{}$ \item $-81x^{2}+72x-12$ \item $-81x^{2}-36x-12$ \item $81x^{2}-72x-12$ \end{itemize} \section{Question} \subsection{Statement} Factor completely: $36y^{30}v^{8}+20y^{15}v^{16}+48y^{21}v^{4}$ \subsection{Choices} \begin{itemize} \item $4yv(9y^{29}v^{7}+5y^{14}v^{15}+12y^{20}v^{3})$ \item $4y^{3}v^{2}(9y^{10}v^{4}+5y^{5}v^{8}+12y^{7}v^{2})$ \item $4y^{14}v^{3}(9y^{16}v^{5}+5yv^{13}+12y^{7}v)$ \item $4y^{15}v^{4}(9y^{15}v^{4}+5v^{12}+12y^{6})\correctchoice{}$ \end{itemize} \section{Question} \subsection{Statement} Factor: $25s^{2}-144z^{2}$ \subsection{Choices} \begin{itemize} \item $(5s-12z)(5s+12z)\correctchoice{}$ \item $(5s+4z)(5s-36z)$ \item $(5s-12z)^{2}$ \item $(5s+36z)(5s-4z)$ \end{itemize} \section{Question} \subsection{Statement} Factor Completely: $9y^{2}-12ys+3y-4s$ \subsection{Choices} \begin{itemize} \item $(3y+s)(3y-4)$ \item $(3y-1)(3y-4s)$ \item $(3y+1)(3y-4s)\correctchoice{}$ \item $(3y+1)(3y+4s)$ \end{itemize} \section{Question} \subsection{Statement} Identify a factor of the following trinominal: $6r^{2}-23r-4$ \subsection{Choices} \begin{itemize} \item $(6r+1)\correctchoice{}$ \item $(3r-2)$ \item $(r+1)$ \item $(r-1)$ \end{itemize} \section{Question} \subsection{Statement} Solve: $x^{2}+4x+3=0$ \subsection{Choices} \begin{itemize} \item $x=-1,$ \ \ $x=-3\correctchoice{}$ \item $x=1,$ \ \ \ \ $x=3$ \item $x=1,$ \ \ \ \ $x=-3$ \item $x=-1,$ \ $x=3$ \end{itemize} \section{Question} \subsection{Statement} Simplify: $\frac{3x^{2}-7x-6}{12x^{2}+5x-2}$ \subsection{Choices} \begin{itemize} \item $\frac{x-1}{4x-1}$ \item $\frac{x-3}{2x+1}$ \item $\frac{x-3}{4x-1}\correctchoice{}$ \item $\frac{x+3}{4x-1}$ \end{itemize} \section{Question} \subsection{Statement} Solve: $2x^{2}+x-21=0$ \subsection{Choices} \begin{itemize} \item $x=-3,$ $\ \ x=\frac{7}{2}$ \item $x=3,$ $\ \ \ \ x=\frac{7}{2}$ \item $x=3,$ $\ \ \ \ x=-\frac{7}{2}\correctchoice{}$ \item $x=-\frac{1}{3},$ $\ x=-\frac{7}{2}$ \end{itemize} \section{Question} \subsection{Statement} Simplify completely: $2\sqrt{64x^{9}u^{2}}$ \subsection{Choices} \begin{itemize} \item $128ux^{4}\sqrt{x}$ \item $16ux^{4}\sqrt{x}\correctchoice{}$ \item $16u\sqrt{x^{9}}$ \item $128ux^{4}\sqrt{x^{9}}$ \end{itemize} \section{Question} \subsection{Statement} Simplify: $\sqrt{4}\left( 5\sqrt{20}-\sqrt{4}\right) $ \subsection{Choices} \begin{itemize} \item $14\sqrt{5}$ \item $20\sqrt{5}-4\correctchoice{}$ \item $5+6\sqrt{5}$ \item $30\sqrt{5}$ \end{itemize} \section{Question} \subsection{Statement} Solve the inequality: $19x+4\leq 51x+1$ \subsection{Choices} \begin{itemize} \item $x\geq -\frac{3}{32}$ \item $x\leq -\frac{3}{32}$ \item $x\geq \frac{3}{32}\correctchoice{}$ \item $x\leq \frac{3}{32}$ \end{itemize} \section{Question} \subsection{Statement} Find the y-intercept for: $-2x-7y=3$ \subsection{Choices} \begin{itemize} \item $\left( 0,-\frac{3}{7}\right) \correctchoice{}$ \item $\left( -\frac{3}{2},0\right) $ \item $\left( 0,-\frac{3}{2}\right) $ \item $\left( -\frac{3}{2},-\frac{3}{7}\right) $ \end{itemize} \section{Question} \subsection{Statement} Find the graph that best matches the given linear equation: $y=4x+3$ \subsection{Choices} \begin{itemize} \item \FRAME{dtbpFX}{3in}{2in}{0in}{}{}{Plot}{\special{language "Scientific Word";type "MAPLEPLOT";width 3in;height 2in;depth 0in;display "USEDEF";plot_snapshots FALSE;mustRecompute FALSE;lastEngine "Maple";xmin "-10";xmax "10";xviewmin "-10.4";xviewmax "10.408";yviewmin "-44.6";yviewmax "38.632";plottype 4;numpoints 49;plotstyle "patch";axesstyle "normal";xis \TEXUX{x};var1name \TEXUX{$x$};function \TEXUX{$4x-3\QTO{correctchoice}{\correctchoice{}}$};linecolor "black";linestyle 1;pointstyle "point";linethickness 1;lineAttributes "Solid";var1range "-10,10";num-x-gridlines 49;curveColor "[flat::RGB:0000000000]";curveStyle "Line";}} \item \FRAME{dtbpFX}{3in}{2in}{0in}{}{}{Plot}{\special{language "Scientific Word";type "MAPLEPLOT";width 3in;height 2in;depth 0in;display "USEDEF";plot_snapshots FALSE;mustRecompute FALSE;lastEngine "Maple";xmin "-10";xmax "10";xviewmin "-10.4";xviewmax "10.408";yviewmin "-44.6";yviewmax "38.632";plottype 4;numpoints 49;plotstyle "patch";axesstyle "normal";xis \TEXUX{x};var1name \TEXUX{$x$};function \TEXUX{$-4x-3$};linecolor "black";linestyle 1;pointstyle "point";linethickness 1;lineAttributes "Solid";var1range "-10,10";num-x-gridlines 49;curveColor "[flat::RGB:0000000000]";curveStyle "Line";}} \item \FRAME{dtbpFX}{3in}{2in}{0in}{}{}{Plot}{\special{language "Scientific Word";type "MAPLEPLOT";width 3in;height 2in;depth 0in;display "USEDEF";plot_snapshots FALSE;mustRecompute FALSE;lastEngine "Maple";xmin "-10";xmax "10";xviewmin "-10.4";xviewmax "10.408";yviewmin "-38.6";yviewmax "44.632";plottype 4;numpoints 49;plotstyle "patch";axesstyle "normal";xis \TEXUX{x};var1name \TEXUX{$x$};function \TEXUX{$-4x+3$};linecolor "black";linestyle 1;pointstyle "point";linethickness 1;lineAttributes "Solid";var1range "-10,10";num-x-gridlines 49;curveColor "[flat::RGB:0000000000]";curveStyle "Line";}} \item $\correctchoice{}$\FRAME{dtbpFX}{3in}{2in}{0in}{}{}{Plot}{% \special{language "Scientific Word";type "MAPLEPLOT";width 3in;height 2in;depth 0in;display "USEDEF";plot_snapshots FALSE;mustRecompute FALSE;lastEngine "Maple";xmin "-10";xmax "10";xviewmin "-10.4";xviewmax "10.408";yviewmin "-38.6";yviewmax "44.632";plottype 4;numpoints 49;plotstyle "patch";axesstyle "normal";xis \TEXUX{x};var1name \TEXUX{$x$};function \TEXUX{$4x+3$};linecolor "black";linestyle 1;pointstyle "point";linethickness 1;lineAttributes "Solid";var1range "-10,10";num-x-gridlines 49;curveColor "[flat::RGB:0000000000]";curveStyle "Line";}} \end{itemize} \end{document}