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Intermediate Geometry : Intermediate Geometry

Study concepts, example questions & explanations for Intermediate Geometry

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8 Diagnostic Tests 250 Practice Tests Question of the Day Flashcards Learn by Concept

Example Questions

Example Question #14 : Other Lines

Which of the following points is found on the line y=-10x+8 ?

Possible Answers:

(20, 208)

(-1, 2)

(5, -58)

(10, -92)

Correct answer:

(10, -92)

Explanation:

To find which point is on the line, take the -coordinate, and plug it into the given equation to solve for . If the -value matches the -coordinate of the same point, then the point is on the line.

Plugging in x=10 into the given equation will give the following:

y=-10x+8

y=-10(10)+8=-100+8=-92

Thus, (10, -92) is on the line.

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Example Question #11 : Other Lines

Which of the following points is found on the line y=13x-11 ?

Possible Answers:

(-10, 141)

(2, 20)

(1, 2)

(13, 169)

Correct answer:

(1, 2)

Explanation:

To find which point is on the line, take the -coordinate, and plug it into the given equation to solve for . If the -value matches the -coordinate of the same point, then the point is on the line.

Plugging in x=1 into the given equation will give the following:

y=13x-11

y=13(1)-11=13-11=2

Thus, (1, 2) is on the line.

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Example Question #16 : Other Lines

Which of the following points is found on the line $y=-\frac{3}{2}x+10$ ?

Possible Answers:

(6, 19)

(12, 28)

(-8, 6)

(-10, 25)

Correct answer:

(-10, 25)

Explanation:

To find which point is on the line, take the -coordinate, and plug it into the given equation to solve for . If the -value matches the -coordinate of the same point, then the point is on the line.

Plugging in x=-10 into the given equation will give the following:

$y=-\frac{3}{2}x+10$

$y=-\frac{3}{2}(-10)+10=15+10=25$

Thus, (-10, 25) is on the line.

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Example Question #12 : Other Lines

Which of the following points is found on the line $y=\frac{1}{5}x-5$ ?

Possible Answers:

(-20, -9)

(12, 14)

$(2, -\frac{4}{5})$

$(-1, \frac{4}{5})$

Correct answer:

(-20, -9)

Explanation:

To find which point is on the line, take the -coordinate, and plug it into the given equation to solve for . If the -value matches the -coordinate of the same point, then the point is on the line.

Plugging in x=-20 into the given equation will give the following:

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

$y=\frac{1}{5}(-20)-5=-4-5=-9$

Thus, (-20, -9) is on the line.

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Example Question #18 : Other Lines

Which of the following points is found on the line 3x+4y=5 ?

Possible Answers:

(-1, 12)

$(0, -\frac{3}{4})$

$(2, -\frac{1}{2})$

$(12, -\frac{31}{4})$

Correct answer:

$(12, -\frac{31}{4})$

Explanation:

Start by rewriting the equation into slope-intercept form.

3x+4y=5

4y=-3x+5

$y=-\frac{3}{4}x+\frac{5}{4}$

To find which point is on the line, take the -coordinate, and plug it into the given equation to solve for . If the -value matches the -coordinate of the same point, then the point is on the line.

Plugging in x=12 into the given equation will give the following:

$y=-\frac{3}{4}x+\frac{5}{4}$

$y=-\frac{3}{4}(12)+\frac{5}{4}=-9+\frac{5}{4}=-\frac{31}{4}$

Thus, $(12, -\frac{31}{4})$ is on the line.

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Example Question #19 : Other Lines

Which of the following points is on the line 12x-4y=18 ?

Possible Answers:

$(-13, -\frac{87}{2})$

$(\frac{3}{2}, 1)$

$(-\frac{1}{2}, 6)$

$(14, \frac{41}{2})$

Correct answer:

$(-13, -\frac{87}{2})$

Explanation:

Start by rewriting the equation into slope-intercept form.

12x-4y=18

-4y=-12x+18

$y=3x-\frac{9}{2}$

To find which point is on the line, take the -coordinate, and plug it into the given equation to solve for . If the -value matches the -coordinate of the same point, then the point is on the line.

Plugging in x=-13 into the given equation will give the following:

$y=3x-\frac{9}{2}$

$y=3(-13)-\frac{9}{2}=-39-\frac{9}{2}=-\frac{87}{2}$

Thus, $(-13, -\frac{87}{2})$ is on the line.

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Example Question #20 : Other Lines

Which of the following points is found on the line 5y+10x=20 ?

Possible Answers:

(-7, 18)

(8, 12)

$(\frac{1}{2}, -3)$

(10, 9)

Correct answer:

(-7, 18)

Explanation:

Start by rewriting the equation into slope-intercept form.

5y+10x=20

5y=-10x+20

y=-2x+4

To find which point is on the line, take the -coordinate, and plug it into the given equation to solve for . If the -value matches the -coordinate of the same point, then the point is on the line.

Plugging in x=-7 into the given equation will give the following:

y=-2x+4

y=-2(-7)+4=18

Thus, (-7, 18) is on the line.

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Example Question #21 : How To Find Out If A Point Is On A Line With An Equation

Which of the following points is on the line 17y+34x=2 ?

Possible Answers:

$(12, \frac{101}{12})$

$(-10, -\frac{116}{17})$

$(8, \frac{240}{17})$

$(6, -\frac{202}{17})$

Correct answer:

$(6, -\frac{202}{17})$

Explanation:

Start by rewriting the equation into slope-intercept form.

17y+34x=2

17y=-34x+2

$y=-2x+\frac{2}{17}$

To find which point is on the line, take the -coordinate, and plug it into the given equation to solve for . If the -value matches the -coordinate of the same point, then the point is on the line.

Plugging in x=6 into the given equation will give the following:

$y=-2x+\frac{2}{17}$

$y=-2(6)+\frac{2}{17}=-\frac{202}{17}$

Thus, $(6, -\frac{202}{17})$ is on the line.

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Example Question #1372 : Intermediate Geometry

Which of the following points is on the line 6x+y=10 ?

Possible Answers:

$(-\frac{3}{2}, 1)$

$(\frac{1}{2}, -13)$

$(-\frac{1}{2}, 13)$

(2, 2)

Correct answer:

$(-\frac{1}{2}, 13)$

Explanation:

Start by rewriting the equation into slope-intercept form.

6x+y=10

y=-6x+10

To find which point is on the line, take the -coordinate, and plug it into the given equation to solve for . If the -value matches the -coordinate of the same point, then the point is on the line.

Plugging in $x=-\frac{1}{2}$ into the given equation will give the following:

y=-6x+10

$y=-6(-\frac{1}{2})+10=3+10=13$

Thus, $(-\frac{1}{2}, 13)$ is on the line.

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Example Question #1373 : Intermediate Geometry

Which of the following points is found on the line -5x-2y=16 ?

Possible Answers:

(-10, -17)

(12, 2)

(-6, 7)

(4, 2)

Correct answer:

(-6, 7)

Explanation:

Start by rewriting the equation into slope-intercept form.

-5x-2y=16

-2y=5x+16

$y=-\frac{5}{2}x-8$

To find which point is on the line, take the -coordinate, and plug it into the given equation to solve for . If the -value matches the -coordinate of the same point, then the point is on the line.

Plugging in x=-6 into the given equation will give the following:

$y=-\frac{5}{2}x-8$

$y=-\frac{5}{2}(-6)-8=15-8=7$

Thus, (-6, 7) is on the line.

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Intermediate Geometry : Intermediate Geometry

Study concepts, example questions & explanations for Intermediate Geometry

All Intermediate Geometry Resources

Example Questions

Example Question #14 : Other Lines

Example Question #11 : Other Lines

Example Question #16 : Other Lines

Example Question #12 : Other Lines

Example Question #18 : Other Lines

Example Question #19 : Other Lines

Example Question #20 : Other Lines

Example Question #21 : How To Find Out If A Point Is On A Line With An Equation

Example Question #1372 : Intermediate Geometry

Example Question #1373 : Intermediate Geometry

All Intermediate Geometry Resources

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