DSQ: Calculating the equation of a perpendicular line - GMAT Quantitative Reasoning

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Question

Line AB is perpindicular to Line BC. Find the equation for Line AB.

1. Point B (the intersection of these two lines) is (2,5).

2. Line BC is parallel to the line y=2x.

Answer

To find the equation of any line, we need 2 pieces of information, the slope of the line and any point on the line. From statement 1, we get a point on Line AB. From statement 2, we get the slope of Line BC. Since we know that AB is perpindicular to BC, we can derive the slope of AB from the slope of BC. Therefore to find the equation of the line, we need the information from both statements.

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Question

Given , find the equation of , a line $\small \perp$ to .

$\small g(x)=-13x+5$

I) .

II) The -intercept of is at $-\frac{5}{13}$ .

Answer

To find the equation of a perpendicular line you need the slope of the line and a point on the line. We can find the slope by knowing g(x).

I) Gives us a point on h(x).

II) Gives us the y-intercept of h(x).

Either of these will be sufficient to find the rest of our equation.

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Question

Find the equation to a line perpendicular to line .

The slope of line is $-\frac{5}{3}$ .

Line goes through point .

Answer

Statement 1: Since the line we're looking for is perpendicular to line XY, our slope will be the inverse of line XY's slope $-\frac{5}{3}$ .

The slope of our line is then $m=\frac{3}{5}$ . Just knowing the slope however, is not sufficient information to answer the question.

Statement 2: We're provided with a point which will allow us the write the equation.

$y-y_{1}=m(x-x_{1})$

$y-3=\frac{3}{5}(x+5)$

$y-3=\frac{3}{5}x+3$

$y=\frac{3}{5}x+6$

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Question

Calculate the equation of a line perpendicular to line .

The equation for line is .

Line goes through point .

Answer

Statement 1: We're given the equation to line AB which contains the slope. Because the line we're being asked for is perpendicular to it, we know the slope will be its inverse.

The slope of our line is then $-\frac{1}{2}$

Statement 2: We can write the equation to the perpendicular line only if we have a point that falls within that line. Luckily, we're given such a point in statement 2.

$y-y_{1}=m(x-x_{1})$

$y+7=-\frac{1}{2}(x-4)$

$y+7=-\frac{1}{2}x+2$

$y=-\frac{1}{2}x-5$

Both statements taken together are sufficient to answer the question, but neither statement alone is sufficient.

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Question

Find the equation of the line perpendicular to .

I) has a slope of .

II) The line must pass through the point .

Answer

Find the equation of the line perpendicular to r(x)

I) r(x) has a slope of -15

II) The line must pass through the point (9, 96)

Recall that perpendicular lines have opposite reciprocal slopes.

Use I) to find the slope of our new line

$m_2=\frac{1}{15}$

Use II) along with our slope to find the y-intercept of our new line.

$96=\frac{1}{15}\cdot 9+b$

$y=\frac{x}{15}+95.4$

Therefore both statements are needed.

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Question

Consider :

Find , a line perpendicular to , given the following:

I) passes through the point .

II) passes through the point .

Answer

Recall that perpendicular lines have opposite, reciprocal slopes. We can find the slope of from the question.

Statement I gives us a point on , which we can use to find the y-intercept of , and then the equation.

The slope of must be the opposite reciprocal of , this makes our slope $-\frac{1}{13}$ .

Statement I tells us that passes through the point , so we can use slope-intercept form to find our equation:

$16=-\frac{1}{13}(14)+b$

$16=-\frac{14}{13}+b$

$\frac{208}{13}=-\frac{14}{13}+b$

$\frac{222}{13}=b$

$b=17\frac{1}{13}$

So, our equation is

$y=-\frac{1}{13}x+17\frac{1}{13}$

Statement II gives us a point on , which does not help us in the slightest with . Therefore, only Statement I is sufficient.

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Question

Give the equation of a line on the coordinate plane.

Statement 1: The line shares an -intercept and its -intercept with the line of the equation .

Statement 2: The line is perpendicular to the line of the equation .

Answer

Assume Statement 1 alone. The -intercept of the line of the equation can be found by substituting and solving for :

The -intercept of the line is the origin ; it follows that this is also the -intercept.

Therefore, Statement 1 alone yields only one point of the line, from which its equation cannot be determined.

Assume Statement 2 alone. The slope of the line of the equation can be calculated by putting it in slope-intercept form :

$11y \div 11 = -6x \div 11$

$y = -\frac{6}{11} x$

The slope of this line is the coefficient of , which is $-\frac{6}{11}$ . A line perpendicular to this one has as its slope the opposite of the reciprocal of $-\frac{6}{11}$ , which is

$- \frac{1}{-\frac{6}{11}} = \frac{11}{6}$ .

However, there are infintely many lines with this slope, so no further information can be determined.

Now assume both statements to be true. From Statement 1, the slope of the line is $m = \frac{11}{6}$ , and from Statement 2, the -coordinate of the -initercept is . Substitute in the slope-intercept form:

$y = \frac{11}{6}x+0$

$y = \frac{11}{6}x$

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