7. Q7c
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Similar Question 1
<p>The zeros of quadratic function are <code class='latex inline'> -7</code> and <code class='latex inline'>-3</code>.</p><p><strong>(a)</strong> Determine an equation for the family of quadratic functions with these zeros.</p><p><strong>(b)</strong> Determine an equation for the member of the family that passes through the point <code class='latex inline'>(2, 18)</code>.</p>
Similar Question 2
<p>Determine an equation for the family of cubic functions with zeros <code class='latex inline'>-4, 0</code>, and <code class='latex inline'>2</code>.</p>
Similar Question 3
<p>Write an equation for a family of polynomial functions with each set of zeros:</p><p><code class='latex inline'>-5, 2, 3</code></p>
Similar Questions
Learning Path
L1 Quick Intro to Factoring Trinomial with Leading a
L2 Introduction to Factoring ax^2+bx+c
L3 Factoring ax^2+bx+c, ex1
Now You Try
<p>Sketch <code class='latex inline'>f(x)</code>.</p><p><code class='latex inline'>g(x) = x^2 (x - 6)^3</code></p>
<p>Sketch a graph of the functions with </p><p> <code class='latex inline'>(-2, 25)</code> and with zeros <code class='latex inline'>-\frac{5}{2}, -1, \frac{7}{2}</code>, and <code class='latex inline'>3</code>.</p>
<p>Determine an equation for the member of the family whose graph has y-intercept of 6 with zeros <code class='latex inline'>-2, -1</code>, and <code class='latex inline'>\frac{1}{2}</code>.</p>
<p>For the equation for a family of even functions with four x-intercepts, two of which are <code class='latex inline'>\frac{2}{3}</code> and 5.</p><p>What is the least degree this family of functors can have?</p>
<p>Determine an equation for each polynomial function. State whether the function is even, odd, or nether. Sketch a graph of</p><p>a quartic function with zeros -2 (order 3) and 1 and y-intercept -2.</p>
<p>Determine an equation for the cubic function represented by this graph.</p><img src="/qimages/1641" />
<p>Write an equation for a family of polynomial functions with each set of zeros:</p><p><code class='latex inline'>-7, 0, 2, 5</code></p>
<p>Determine an equation for each polynomial function. State whether the function is even, odd, or nether. Sketch a graph of </p><p>a quintic function with zeros -3, -2 (order 2). and 2 (order 2) that passes through the point (1.-18).</p>
<p>Sketch a graph of the functions whose</p><p>equation for the member of the family whose graph has <code class='latex inline'>y-</code>intercept of <code class='latex inline'>-4</code> and zeros <code class='latex inline'>-4, -1, 2</code>, and <code class='latex inline'>3</code>.</p>
<p>Determine an equation for the family of cubic functions with zeros <code class='latex inline'>-2, -1</code>, and <code class='latex inline'>\frac{1}{2}</code>.</p>
<p>Polynomial function has zeros at <code class='latex inline'>-3, -1, 2</code>. Write an equation for each function. Then, sketch a graph of the function.</p><p>a cubic function with a positive leading coefficient</p>
<p>Determine an equation for each polynomial function. State whether the function is even, odd, or nether. Sketch a graph of</p><p>a quintic function with zeros -1(order 3) and 3 (order 2) that passes through the point (-2, 50).</p>
<p> Determine whether each graph represents an even-degree or an odd-degree polynomial function. Explain your reasoning.</p><img src="/qimages/296" />
<p>Write an equation for a family of polynomial functions with each set of zeros:</p><p><code class='latex inline'>-5, 2, 3</code></p>
<p>Write equations for two functors that belong to the family with zeros <code class='latex inline'>-4, -1, 2</code>, and <code class='latex inline'>3</code>.</p>
<p>Find the cubic function that has the following zeros.</p><p>Zeros: <code class='latex inline'>-2</code>, <code class='latex inline'>\frac{3}{4}</code>, <code class='latex inline'>5</code> (order 2)</p>
<p>Determine an equation for the polynomial function that corresponds to each graph.</p><img src="/qimages/301" />
<p>Determine an equation for the family of cubic functions with zeros <code class='latex inline'>-\frac{5}{2}, -1, \frac{7}{2}</code>, and <code class='latex inline'>3</code>.</p>
<p>Determine, algebraically, whether each function has point symmetry about the origin or line symmetry about the y-axis. State whether each function is even, odd, or neither. Show your work.</p><p> <code class='latex inline'>p(x) = -(x + 5)^2(x -5)^3</code></p>
<p> Determine whether each graph represents an even-degree or an odd-degree polynomial function. Explain your reasoning.</p><img src="/qimages/295" />
<p>Determine an even function equation for a function with x-intercepts at <code class='latex inline'>\frac{2}{3}</code> and <code class='latex inline'>5</code>, passing through the point <code class='latex inline'>(-1, -96)</code></p>
<p>Write equations for two even functions with four x-intercepts, two of which are <code class='latex inline'>\frac{2}{3}</code> and 5.</p>
<p>Find the cubic function that has the following zeros.</p><p>Zeros: -1 ,4 (order 2)</p>
<p>Sketch <code class='latex inline'>f(x)</code>.</p><p><code class='latex inline'>y = (x +1)^3</code></p>
<p>Determine an equation for a function with <code class='latex inline'>x</code>-intercepts at <code class='latex inline'>\frac{2}{3}</code>, 5 and passing through the point <code class='latex inline'>(-1, -96)</code> and reflected on the <code class='latex inline'>x</code>-axis.</p>
<p>Sketch a graph of a polynomial functions with </p><p> y-intercept of <code class='latex inline'>6</code> with zeros <code class='latex inline'>-2, -1</code>, and <code class='latex inline'>\frac{1}{2}</code>.</p>
<p>For the equation for a family of even functions with four x-intercepts, two of which are <code class='latex inline'>\frac{2}{3}</code> and 5.</p><p>Determine an equation for the member of this family that passes through the point <code class='latex inline'>(-1, -96)</code> and reflection in the x-axis.</p>
<p>Write equations for two functions that belong to family with zeros <code class='latex inline'>-\frac{5}{2}, -1, \frac{7}{2}</code>, and <code class='latex inline'>3</code>.</p>
<p>Sketch the polynomials functions with </p><p> equations of polynomials with zeros <code class='latex inline'>-4, 0</code>, and <code class='latex inline'>2</code> and passing through <code class='latex inline'>(-2, 4)</code>.</p>
<p>Determine an equation for the polynomial function that corresponds to each graph.</p><img src="/qimages/303" />
<p>Write equations for two functions that belong to this family with zeros <code class='latex inline'>-2, -1</code>, and <code class='latex inline'>\frac{1}{2}</code>.</p>
<p>Write an equation for a family of polynomial functions with each set of zeros:</p><p><code class='latex inline'>-4, -1, 9</code></p>
<p>For the equation for a family of even functions with four x-intercepts, two of which are <code class='latex inline'>\frac{2}{3}</code> and 5.</p><p>Determine an equation for the member of this family that passes through the point <code class='latex inline'>(-1, -96)</code>.</p>
<p>Find the cubic function that has the following zeros.</p><p>Zeros: -2 (order 3)</p>
<p>Determine an equation for each polynomial function. State whether the function is even, odd, or nether. Sketch a graph of </p><p>a cubic function with zeros <code class='latex inline'>-2</code> (order 2) and <code class='latex inline'>3</code> and <code class='latex inline'>y</code>-intercept <code class='latex inline'>9</code></p>
<p>Polynomial function has zeros at <code class='latex inline'>-3, -1, 2</code>. Write an equation for each function. Then, sketch a graph of the function.</p><p>a quartic function that touches the x-axis at <code class='latex inline'>-1</code>. <code class='latex inline'>-1</code> is a root of order 2</p>
<p> Determine whether each graph represents an even-degree or an odd-degree polynomial function. Explain your reasoning.</p><img src="/qimages/297" />
<p>Sketch the graph.</p><p><code class='latex inline'>y = x(x- 3)^2</code></p>
<p>Polynomial function has zeros at <code class='latex inline'>-3, -1, 2</code>. Write an equation for each function. Then, sketch a graph of the function.</p><p>a quartic function that extends from quadrant <code class='latex inline'>3</code> to quadrant <code class='latex inline'>4</code></p>
<p>Write equations for two functions that belong to family of polynomials with zeros <code class='latex inline'>-4, 0</code>, and <code class='latex inline'>2</code>.</p>
<p>The zeros of quadratic function are <code class='latex inline'> -7</code> and <code class='latex inline'>-3</code>.</p><p><strong>(a)</strong> Determine an equation for the family of quadratic functions with these zeros.</p><p><strong>(b)</strong> Determine an equation for the member of the family that passes through the point <code class='latex inline'>(2, 18)</code>.</p>
<p>Polynomial function has zeros at <code class='latex inline'>-3, -1, 2</code>. Write an equation for each function. Then, sketch a graph of the function.</p><p>a quintic function that extends from quadrant <code class='latex inline'>3</code> to quadrant <code class='latex inline'>1</code></p>
<p>Write an equation for a family of even functions with four x-intercepts, two of which are <code class='latex inline'>\frac{2}{3}</code> and <code class='latex inline'>5</code>.</p>
<p>Write an equation for a family of polynomial functions with each set of zeros:</p><p><code class='latex inline'>1, 6 ,-3</code></p>
<p>Determine an equation for the member of the family whose graph passes through the point <code class='latex inline'>(-2, 25)</code> and with zeros <code class='latex inline'>-\frac{5}{2}, -1, \frac{7}{2}</code>, and <code class='latex inline'>3</code>.</p>
<p>Determine an equation for the family of cubic functions with zeros <code class='latex inline'>-4, 0</code>, and <code class='latex inline'>2</code>.</p>
<p>a) Determine an equation for the family of quartic functions with zeros <code class='latex inline'>-4, -1, 2</code>, and <code class='latex inline'>3</code>.</p><p>b) Write equations for two functions that belong to this family</p><p>c) Determine an equation for the member of the family whose graph has a y~intercept of -4.</p><p>d) Sketch a graph of the functions in parts b) and c).</p>
<p> Determine an equation for the member of the family whose graph which passes through <code class='latex inline'>(-2, 4)</code> with zeros <code class='latex inline'>-4, 0</code>, and <code class='latex inline'>2</code>.</p>
<p>Determine, algebraically, whether each function has point symmetry about the origin or line symmetry about the y-axis. State whether each function is even, odd, or neither. Show your work.</p><p><code class='latex inline'>h(x) = (3x + 2)^2(x -4)(1+x)(2x -3)</code></p>
<p>Determine an equation for the member of the family whose graph has y-intercept of -4 and zeros -4, -1, 2, and 3.</p>
<p>Determine an equation for the polynomial function that corresponds to each graph.</p><img src="/qimages/304" />
<p>Find the cubic function that has the following zeros.</p><p>Zeros: <code class='latex inline'>3</code>, <code class='latex inline'>-\frac{1}{2}</code> (order 2)</p>
<p>Determine an equation for the polynomial function that corresponds to each graph.</p><img src="/qimages/302" />
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