12. Q12c
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Similar Question 1
<p>Calculate the distance between each line and the point. Round your answer to one decimal place.</p><p><code class='latex inline'> \displaystyle y = 4x -2, (-3, 3) </code></p>
Similar Question 2
<p>Find the shortest distance from <code class='latex inline'>(1, 0)</code> to the line <code class='latex inline'>y = 2x + 5</code> .</p>
Similar Question 3
<p>A cable company is connecting a new customer to its cable network. On a site plan, the customer&#39;s house has coordinates <code class='latex inline'>H(7, 17)</code>. The equation <code class='latex inline'>y = \frac{1}{2}x + 4</code> represents the existing trunk cable. The cable company wants to keep the branch to the customer&#39;s house as short as possible.</p><p> How long will the branch connection be if each unit on the grid of the site pan represents <code class='latex inline'>10</code> m?</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>Calculate the distance between each line and the point. Round your answer to one decimal place.</p><p><code class='latex inline'>5x - 2y = 10</code>, <code class='latex inline'>(2, 4.5)</code></p>
<p>Calculate the distance between each line and the point. Round your answer to one decimal place.</p><p><code class='latex inline'> \displaystyle y = 4x -2, (-3, 3) </code></p>
<p>Determine the shortest distance from the point <code class='latex inline'>D(5, 4)</code> to the line represented by <code class='latex inline'>3x + 5y -4 = 0</code>.</p>
<p>Find the shortest distance from <code class='latex inline'>(1, 1)</code> to the line <code class='latex inline'>y = x + 3</code>.</p>
<p>Determine the shortest distance from the point <code class='latex inline'>H(5, 2)</code> to the line through points <code class='latex inline'>J(-6, 4)</code> and <code class='latex inline'>K(-2, -4)</code>.</p>
<p>Determine the shortest distance from the point <code class='latex inline'>(5, 2)</code> to the line represented by <code class='latex inline'>y = 2x + 1</code>. Use a diagram to check your answer.</p>
<p>Determine the distance between point <code class='latex inline'>(-4, 4)</code> and the line <code class='latex inline'>y = 3x - 4</code>.</p>
<p>Find the shortest distance from <code class='latex inline'>(1, -3)</code> to the line <code class='latex inline'>y = 2x + 5</code> .</p>
<p>Determine the shortest distance from the point <code class='latex inline'>(5, -1)</code> to the line <code class='latex inline'> y = 2x -1 </code>. Round your answer to the nearest tenth of a unit.</p>
<p>Calculate the distance between each line and the point. Round your answer to one decimal place.</p><p><code class='latex inline'>y = -x + 5</code>, <code class='latex inline'>(-1, -2)</code></p>
<p>Calculate the distance between each line and the point. Round your answer to one decimal place.</p><p><code class='latex inline'>2x + 3y = 6</code>, <code class='latex inline'>(7, 6)</code></p>
<p>Find the shortest distance from <code class='latex inline'>(1, 0)</code> to the line <code class='latex inline'>y = 2x + 5</code> .</p>
<p>Determine the shortest distance from the point <code class='latex inline'>E(1, -4)</code> to the line through points <code class='latex inline'>F(-5, 2)</code> and <code class='latex inline'>G(3, 4)</code>. Show your work.</p>
<p>A cable company is connecting a new customer to its cable network. On a site plan, the customer&#39;s house has coordinates <code class='latex inline'>H(7, 17)</code>. The equation <code class='latex inline'>y = \frac{1}{2}x + 4</code> represents the existing trunk cable. The cable company wants to keep the branch to the customer&#39;s house as short as possible.</p><p> How long will the branch connection be if each unit on the grid of the site pan represents <code class='latex inline'>10</code> m?</p>
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