Solve for $$ x $$ : 1.1.1 $$ (2 x-3)(x+7)=0 $$ 1.1.2 $$ 7 x^{2}+3 x-2=0 $$ (leave your answer correct to TWO decimal places) 1.1.3 $$ \sqrt{x-1}+3=x $$ 1.1.4 $$ \quad x^{2}3(x+6) $$ Solve for $$ x $$ and $$ y $$ simultaneously: $$ \begin{array}{l} 2 y+x=1 \ x^{2}+y^{2}+3 x y+y=0 \end{array} $$ If $$ f(x)=0 $$ has roots $$ x=\frac{-5 \pm \sqrt{3-12 k^{2}}}{4} $$, for which values of $$ k $$ will the roots be equal? Back to Contents 5

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Solve for $$ x $$ : 1.1.1 $$ (2 x-3)(x+7)=0 $$ 1.1.2 $$ 7 x^{2}+3 x-2=0 $$ (leave your answer correct to TWO decimal places) 1.1.3 $$ \sqrt{x-1}+3=x $$ 1.1.4 $$ \quad x^{2}>3(x+6) $$ Solve for $$ x $$ and $$ y $$ simultaneously: $$ \begin{array}{l} 2 y+x=1 \ x^{2}+y^{2}+3 x y+y=0 \end{array} $$ If $$ f(x)=0 $$ has roots $$ x=\frac{-5 \pm \sqrt{3-12 k^{2}}}{4} $$, for which values of $$ k $$ will the roots be equal? Back to Contents 5

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Solve the equation by following steps: - step0: Solve for $$x$$: $$3=x$$ - step1: Swap the sides: $$x=3$$ Solve the equation $$ 3-12 k^{2}=0 $$. Solve the quadratic equation by following steps: - step0: Solve using square roots: $$3-12k^{2}=0$$ - step1: Add or subtract both sides: $$-12k^{2}=-3$$ - step2: Divide both sides: $$\frac{-12k^{2}}{-12}=\frac{-3}{-12}$$ - step3: Divide the numbers: $$k^{2}=\frac{1}{4}$$ - step4: Simplify the expression: $$k=\pm \sqrt{\frac{1}{4}}$$ - step5: Simplify the expression: $$k=\pm \frac{1}{2}$$ - step6: Separate into possible cases: $$\begin{align}&k=\frac{1}{2}\&k=-\frac{1}{2}\end{align}$$ - step7: Rewrite: $$k_{1}=-\frac{1}{2},k_{2}=\frac{1}{2}$$ Solve the equation $$ x^{2}-3(x+6)>0 $$. Solve the inequality by following steps: - step0: Solve the inequality by testing the values in the interval: $$x^{2}-3\left(x+6\right)>0$$ - step1: Rearrange the terms: $$x^{2}-3x-18>0$$ - step2: Rewrite the expression: $$x^{2}-3x-18=0$$ - step3: Factor the expression: $$\left(x-6\right)\left(x+3\right)=0$$ - step4: Separate into possible cases: $$\begin{align}&x-6=0\&x+3=0\end{align}$$ - step5: Solve the equation: $$\begin{align}&x=6\&x=-3\end{align}$$ - step6: Determine the test intervals: $$\begin{align}&x<-3\&-36\end{align}$$ - step7: Choose a value: $$\begin{align}&x_{1}=-4\&x_{2}=2\&x_{3}=7\end{align}$$ - step8: Test the chosen value: $$\begin{align}&x<-3\textrm{ }\textrm{is the solution}\&-36\textrm{ }\textrm{is the solution}\end{align}$$ - step9: The final solution is $$x \in \left(-\infty,-3\right)\cup \left(6,+\infty\right):$$ $$x \in \left(-\infty,-3\right)\cup \left(6,+\infty\right)$$ Solve the equation $$ 7 x^{2}+3 x-2=0 $$. Solve the quadratic equation by following steps: - step0: Solve using the quadratic formula: $$7x^{2}+3x-2=0$$ - step1: Solve using the quadratic formula: $$x=\frac{-3\pm \sqrt{3^{2}-4\times 7\left(-2\right)}}{2\times 7}$$ - step2: Simplify the expression: $$x=\frac{-3\pm \sqrt{3^{2}-4\times 7\left(-2\right)}}{14}$$ - step3: Simplify the expression: $$x=\frac{-3\pm \sqrt{65}}{14}$$ - step4: Separate into possible cases: $$\begin{align}&x=\frac{-3+\sqrt{65}}{14}\&x=\frac{-3-\sqrt{65}}{14}\end{align}$$ - step5: Rewrite the fraction: $$\begin{align}&x=\frac{-3+\sqrt{65}}{14}\&x=-\frac{3+\sqrt{65}}{14}\end{align}$$ - step6: Rewrite: $$x_{1}=-\frac{3+\sqrt{65}}{14},x_{2}=\frac{-3+\sqrt{65}}{14}$$ Solve the system of equations $$ 2 y+x=1;x^{2}+y^{2}+3 x y+y=0 $$. Solve the system of equations by following steps: - step0: Solve using the substitution method: $$\left\{ \begin{array}{l}2y+x=1\x^{2}+y^{2}+3xy+y=0\end{array}\right.$$ - step1: Solve the equation: $$\left\{ \begin{array}{l}x=1-2y\x^{2}+y^{2}+3xy+y=0\end{array}\right.$$ - step2: Substitute the value of $$x:$$ $$\left(1-2y\right)^{2}+y^{2}+3\left(1-2y\right)y+y=0$$ - step3: Simplify: $$1-y^{2}=0$$ - step4: Move the constant to the right side: $$-y^{2}=0-1$$ - step5: Remove 0: $$-y^{2}=-1$$ - step6: Change the signs: $$y^{2}=1$$ - step7: Simplify the expression: $$y=\pm \sqrt{1}$$ - step8: Simplify: $$y=\pm 1$$ - step9: Separate into possible cases: $$y=1\cup y=-1$$ - step10: Rearrange the terms: $$\left\{ \begin{array}{l}x=1-2y\y=1\end{array}\right.\cup \left\{ \begin{array}{l}x=1-2y\y=-1\end{array}\right.$$ - step11: Calculate: $$\left\{ \begin{array}{l}x=-1\y=1\end{array}\right.\cup \left\{ \begin{array}{l}x=3\y=-1\end{array}\right.$$ - step12: Check the solution: $$\left\{ \begin{array}{l}x=-1\y=1\end{array}\right.\cup \left\{ \begin{array}{l}x=3\y=-1\end{array}\right.$$ - step13: Rewrite: $$\left(x,y\right) = \left(-1,1\right)\cup \left(x,y\right) = \left(3,-1\right)$$ Let's solve each part step by step. ### 1.1.1 Solve $$ (2x - 3)(x + 7) = 0 $$ To find the values of $$ x $$, we set each factor to zero: 1. $$ 2x - 3 = 0 $$ - Solving gives $$ 2x = 3 $$ or $$ x = \frac{3}{2} $$. 2. $$ x + 7 = 0 $$ - Solving gives $$ x = -7 $$. Thus, the solutions are: - $$ x = \frac{3}{2} $$ and $$ x = -7 $$. ### 1.1.2 Solve $$ 7x^2 + 3x - 2 = 0 $$ Using the quadratic formula $$ x = \frac{-b \pm \sqrt{b^2 - 4ac}}{2a} $$: - Here, $$ a = 7 $$, $$ b = 3 $$, and $$ c = -2 $$. Calculating the discriminant: $$ b^2 - 4ac = 3^2 - 4 \cdot 7 \cdot (-2) = 9 + 56 = 65 $$ Now applying the quadratic formula: $$ x = \frac{-3 \pm \sqrt{65}}{14} $$ Calculating the two roots: - $$ x_1 \approx -0.79 $$ - $$ x_2 \approx 0.36 $$ Thus, the solutions are: - $$ x \approx -0.79 $$ and $$ x \approx 0.36 $$ (to two decimal places). ### 1.1.3 Solve $$ \sqrt{x - 1} + 3 = x $$ Rearranging gives: $$ \sqrt{x - 1} = x - 3 $$ Squaring both sides: $$ x - 1 = (x - 3)^2 $$ Expanding the right side: $$ x - 1 = x^2 - 6x + 9 $$ Rearranging gives: $$ 0 = x^2 - 7x + 10 $$ Factoring: $$ 0 = (x - 5)(x - 2) $$ Thus, the solutions are: - $$ x = 5 $$ and $$ x = 2 $$. ### 1.1.4 Solve $$ x^2 > 3(x + 6) $$ Rearranging gives: $$ x^2 - 3x - 18 > 0 $$ Factoring: $$ (x - 6)(x + 3) > 0 $$ The critical points are $$ x = 6 $$ and $$ x = -3 $$. Testing intervals: - For $$ x < -3 $$: both factors are negative, product is positive. - For $$ -3 < x < 6 $$: one factor is negative, product is negative. - For $$ x > 6 $$: both factors are positive, product is positive. Thus, the solution is: - $$ x \in (-\infty, -3) \cup (6, +\infty) $$. ### Simultaneous Equations Solving the system: $$ \begin{array}{l} 2y + x = 1 \ x^2 + y^2 + 3xy + y = 0 \end{array} $$ From the first equation, express $$ x $$: $$ x = 1 - 2y $$ Substituting into the second equation: $$ (1 - 2y)^2 + y^2 + 3(1 - 2y)y + y = 0 $$ Expanding and simplifying leads to: $$ y^2 - 3y + 1 = 0 $$ Using the quadratic formula: $$ y = \frac{3 \pm \sqrt{5}}{2} $$ Substituting back to find $$ x $$: - For $$ y_1 = \frac{3 + \sqrt{5}}{2} $$, $$ x_1 = 1 - 2y_1 $$. - For $$ y_2 = \frac{3 - \sqrt{5}}{2} $$, $$ x_2 = 1 - 2y_2 $$. Thus, the solutions are: - $$ (x, y) = (-1, 1) $$ and $$ (3, -1) $$. ### Roots of $$ f(x) = 0 $$ For the roots to be equal: $$ 3 - 12k^2 = 0 $$ Solving gives: $$ k^2 = \frac{1}{4} \implies k = \pm \frac{1}{2} $$ Thus, the values of $$ k $$ for which the roots are equal are: - $$ k = -0.5 $$ and $$ k = 0.5 $$. 1.1.1: $$ x = \frac{3}{2} $$ and $$ x = -7 $$ 1.1.2: $$ x \approx -0.79 $$ and $$ x \approx 0.36 $$ 1.1.3: $$ x = 5 $$ and $$ x = 2 $$ 1.1.4: $$ x < -3 $$ or $$ x > 6 $$ Simultaneous Equations: $$ (x, y) = (-1, 1) $$ and $$ (3, -1) $$ Roots of $$ f(x) = 0 $$: $$ k = -0.5 $$ and $$ k = 0.5 $$

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