Difference between revisions of "2018 AMC 12B Problems/Problem 3"

Revision as of 14:06, 16 February 2018

A line with slope 2 intersects a line with slope 6 at the point $(40,30)$ . What is the distance between the $x$ -intercepts of these two lines?

$(\text{A}) 5 \qquad (\text{B}) 10 \qquad (\text{C}) 20 \qquad (\text{D}) 25 \qquad (\text{E}) 50$

Solution 1

Using the slope-intercept form, we get the equations $y-30 = 6(x-40)$ and $y-30 = 2(x-40)$ . Simplifying, we get $6x-y=210$ and $2x-y=50$ . Letting $y=0$ in both equations gives the $x$ -intercepts: $x=35$ and $x=25$ , respectively. Thus the distance between them is $35-25 = 10 \rightarrow (\text{B})$ (Giraffefun)

Revision as of 14:05, 16 February 2018 (view source) Giraffefun (talk \| contribs) (→‎Solution 1) ← Older edit		Revision as of 14:06, 16 February 2018 (view source) Giraffefun (talk \| contribs) (→‎Solution 1) Newer edit →
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	Using the slope-intercept form, we get the equations <math>y-30 = 6(x-40)</math> and <math>y-30 = 2(x-40)</math>. Simplifying, we get <math>6x-y=210</math> and <math>2x-y=50</math>. Letting <math>y=0</math> in both equations gives the <math>x</math>-intercepts: <math>x=35</math> and <math>x=25</math>, respectively. Thus the distance between them is <math>35-25 = 10 \rightarrow (\text{B})</math>		Using the slope-intercept form, we get the equations <math>y-30 = 6(x-40)</math> and <math>y-30 = 2(x-40)</math>. Simplifying, we get <math>6x-y=210</math> and <math>2x-y=50</math>. Letting <math>y=0</math> in both equations gives the <math>x</math>-intercepts: <math>x=35</math> and <math>x=25</math>, respectively. Thus the distance between them is <math>35-25 = 10 \rightarrow (\text{B})</math>
		+	(Giraffefun)

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Difference between revisions of "2018 AMC 12B Problems/Problem 3"

Revision as of 14:06, 16 February 2018

Solution 1