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SAT II Math I : X-intercept and y-intercept

Study concepts, example questions & explanations for SAT II Math I

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Example Question #1 : X Intercept And Y Intercept

Find the y-intercept of the following line.

4x+3y=-12

Possible Answers:

$\small 3$

$\small -12$

Correct answer:

Explanation:

To find the y-intercept of any line, we must get the equation into the form

y=mx+b

where m is the slope and b is the y-intercept.

To manipulate our equation into this form, we must solve for y. First, we must move the x term to the right side of our equation by subtracting it from both sides.

(4x+3y)-4x = (-12)-4x

3y = -4x-12

To isolate y, we now must divide each side by 3.

$\frac{3y}{3}=\frac{-4x}{3}-\frac{12}{3}$

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

Now that our equation is in the desired form, our y-intercept is simply

$\small b=-4$

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Example Question #1 : X Intercept And Y Intercept

Solve for the -intercepts of this equation:

y=5x^2+13x-178

Round each of your answers to the nearest tenth.

Possible Answers:

8.1 and 12.3

-7.4 and 4.8

-13.1 and -4.2

-4.8 and 1.3

4.2 and 7.1

Correct answer:

-7.4 and 4.8

Explanation:

For an equation like this, you should use the quadratic formula to solve for the roots. We can easily get our equation into proper form by substituting for :

5x^2+13x-178 = 0

Recall that the general form of the quadratic formula is:

$\frac{-b\pm\sqrt{b^2-4ac}}{2a}$

Based on our equations, the following are your formula values:

a=5

b=13

c=-178

Therefore, the quadratic formula will be:

$\frac{-13\pm\sqrt{13^2-4(5)(-178)}}{2*5}$

Simplifying, you get:

$\frac{-13\pm\sqrt{169+3560}}{10}$

$\frac{-13\pm\sqrt{3729}}{10}$

Using a calculator, you will get:

4.80655385630881 and -7.406553856308809

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Example Question #21 : Properties Of Functions And Graphs

Solve for the -intercepts of this equation:

3y +x^2 = 3x^2+6x-15

Round each of your answers to the nearest tenth.

Possible Answers:

-5.5 and 1.4

-10.5 and -7.1

-1.3 and 2.4

-12.4 and 4.4

1.6 and 4.6

Correct answer:

1.6 and 4.6

Explanation:

For an equation like this, you should use the quadratic formula to solve for the roots. We can easily get our equation into proper form by substituting for :

3(0) +x^2 = 3x^2+6x-15

0= 2x^2+6x-15

Recall that the general form of the quadratic formula is:

$\frac{-b\pm\sqrt{b^2-4ac}}{2a}$

Based on our equations, the following are your formula values:

a=2

b=6

c=-15

Therefore, the quadratic formula will be:

$\frac{-6\pm\sqrt{(6)^2-4(2)(-15)}}{2(2)}$

Simplifying, you get:

$\frac{-6\pm\sqrt{36+120}}{4}$

$\frac{-6\pm\sqrt{156}}{4}$

Using a calculator, you will get:

1.6224989991992 and −4.622498999199199

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Example Question #1 : X Intercept And Y Intercept

Solve for the -intercepts of this equation:

$\frac{3x+4+y}{x-2} = 2x+5$

Round each of your answers to the nearest tenth.

Possible Answers:

-2.2 and 3.2

3.8 and 5.9

-1.3 and 8.8

-12.3 and 3.4

-4.5 and 1.1

Correct answer:

-2.2 and 3.2

Explanation:

For an equation like this, you should use the quadratic formula to solve for the roots. We can easily get our equation into proper form by substituting for . Then, we need to get it into standard form:

$\frac{3x+4+0}{x-2} = 2x+5$

3x+4 = (2x+5) * (x - 2)

3x+4 = 2x^2-4x+5x-10

3x+4 = 2x^2+x-10

0 = 2x^2-2x-14

Recall that the general form of the quadratic formula is:

$\frac{-b\pm\sqrt{b^2-4ac}}{2a}$

Based on our equations, the following are your formula values:

a = 2

b=-2

c=14

Therefore, the quadratic formula will be:

$\frac{2\pm\sqrt{(-2)^2-4(2)(-14)}}{2(2)}$

Simplifying, you get:

$\frac{2\pm\sqrt{4+112}}{4}$

$\frac{2\pm\sqrt{116}}{4}$

Using a calculator, you will get:

3.19258240356725 and -2.192582403567252

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Example Question #5 : X Intercept And Y Intercept

What are the -intercepts of the following equation?

x^2+(y-5)^2 = 121

Round each of your answers to the nearest tenth.

Possible Answers:

-6.0 and 16.0

-5.0 and 5.0

-16.0 and 5.0

-11.0 and 5.0

-16.0 and 6.0

Correct answer:

-6.0 and 16.0

Explanation:

There are two ways to solve this. First, you could substitute in for :

0^2+(y-5)^2 = 121

Take the square-root of both sides and get:

$y-5 = \pm11$

$y=5\pm11$

Therefore, your two answers are and .

You also could have done this by noticing that the problem is a circle of radius , shifted upward by .

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Example Question #2 : X Intercept And Y Intercept

Find the -intercepts of the following equation:

y^2+x+5y=3x^2-2

Round each of your answers to the nearest tenth.

Possible Answers:

-4.6 and -0.4

-4.4 and 1.7

-5.2 and -3.1

5.2 and 8.9

1.5 and 2.4

Correct answer:

-4.6 and -0.4

Explanation:

y^2+0+5y=3(0)^2-2

y^2+5y=-2

y^2+5y+2=0

Recall that the general form of the quadratic formula is:

$\frac{-b\pm\sqrt{b^2-4ac}}{2a}$

Based on our equations, the following are your formula values:

a = 1

b = 5

c=2

Therefore, the quadratic formula will be:

$\frac{-5\pm\sqrt{5^2-4(1)(2)}}{2(2)}$

Simplifying, you get:

$\frac{-5\pm\sqrt{25-8}}{4}$

$\frac{-5\pm\sqrt{17}}{4}$

Using a calculator, you will get:

-4.561552812808831 and -0.43844718719117

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Example Question #1 : X Intercept And Y Intercept

What is the -intercept of the following equation?

44x-2y=120+4x

Possible Answers:

None of the others

Correct answer:

Explanation:

The easiest way to solve for this kind of simple -intercept is to set equal to . You can then solve for the value in order to find the relevant intercept.

44x-2(0)=120+4x

44x=120+4x

Solve for :

40x = 120

Divide both sides by 40:

x = 3

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Example Question #8 : X Intercept And Y Intercept

y=15x-30

What is the x-intercept of the above equation?

Possible Answers:

Correct answer:

Explanation:

To find the x-intercept, you must plug in for .

This gives you,

0=15x-30 and you must solve for .

First, add to both sides which gives you,

30=15x .

Then divide both sides by to get,

x=2 .

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Example Question #9 : X Intercept And Y Intercept

Find the -intercepts of the following equation:

x^2+(y+14)^2 = 25

Round each of your answers to the nearest tenth.

Possible Answers:

11.0 and 36.0

-19.0 and -9.0

-16.4 and 12.5

-5.0 and 5.0

5.5 and 12.4

Correct answer:

-19.0 and -9.0

Explanation:

There are two ways to solve this. First, you could substitute in for :

0^2+(y+14)^2 = 25

Take the square-root of both sides and get:

$y+14 = \pm5$

$y= -14\pm5$

Therefore, your two answers are and .

You also could have done this by noticing that the problem is a circle of radius , shifted downward by .

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Example Question #31 : Functions And Graphs

What is the x-intercept of the given equation? 2x+3y = 1

Possible Answers:

$\frac{1}{6}$

$-\frac{1}{2}$

$-\frac{1}{3}$

$\frac{1}{2}$

Correct answer:

$\frac{1}{2}$

Explanation:

In order to determine the x-intercept, we will need to let y=0 , and solve for .

2x+3(0) = 1

2x=1

Divide both sides by two.

$\frac{2x}{2}=\frac{1}{2}$

The answer is: $\frac{1}{2}$

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SAT II Math I : X-intercept and y-intercept

Study concepts, example questions & explanations for SAT II Math I

All SAT II Math I Resources

Example Questions

Example Question #1 : X Intercept And Y Intercept

Example Question #1 : X Intercept And Y Intercept

Example Question #21 : Properties Of Functions And Graphs

Example Question #1 : X Intercept And Y Intercept

Example Question #5 : X Intercept And Y Intercept

Example Question #2 : X Intercept And Y Intercept

Example Question #1 : X Intercept And Y Intercept

Example Question #8 : X Intercept And Y Intercept

Example Question #9 : X Intercept And Y Intercept

Example Question #31 : Functions And Graphs

All SAT II Math I Resources

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