Analytic Geometry Exercices

Question 1

What is a circle?

Answer 1

A set of points that all have equal distance from a fixed point called a center.

Question 2

What is the equation of a line?

Answer 2

y=mx+b

Question 3

How do you find the slope of a line?

Answer 3

Question 4

If the slope of a line is positive then as x ____________, y ______________.

Answer 4

increases

Question 5

If the slope of a line is negative then as x ____________, y ______________.

Answer 5

x increases y decreases

Question 6

The MORE the slope is positive or negative, the ___________ the line.

Answer 6

steeper

Question 7

If the slope is zero, then the line is _______________

Answer 7

horizontal

Question 8

In the equation ‘‘y=mx+b’’, what is b?

Answer 8

a constant, the y-intercept

Question 9

What is the the point-slope formula of a line?

Answer 9

y - y1= m (x - x1)

Question 10

Find the equation of the line L through the points (5, -15) and (50, 10).

Answer 10

Question 11

How do you express a horizontal line?

Answer 11

y = b, where b is the the y-intercept of the line

Question 12

How do you express a vertical line?

Answer 12

x = a, where x is the x intercept of the line

Question 13

Explain why, using 2 points along a line, horizontal lines have a slope of 0.

Answer 13

Horizontal lines have a slope of zero since y2 -y1 = 0 for any two points on the line.

Question 14

Why do we say that vertical lines are undefined?

Answer 14

Since x2 - x1 = 0, when we plug it in the Dy/Dx formula, anything divided by 0 is undefined.

Question 15

What are parallel lines?

Answer 15

Two lines that are the same distance apart and have the same slope.

Question 16

What are perpendicular lines?

Answer 16

Perpendicular lines meet at right angles (90 degrees).

Question 17

How do you verify that two lines are perpendicular to eachother?

Answer 17

Check that their slopes are negative reciprocals of eachother.

Check that their slopes multiply together to give -1.

Question 18

Find an equation of the line L2 perpendicular to L1: 2x - 3y = -1 passing through the point (6, -5).

Answer 18

Question 19

What is the standard form of a given line?

Answer 19

ax + by = c

Question 20

How could we find the distance D between two points P(x1,y1) and Q(x2,y2)? What would be the formula?

Answer 20

Question 21

Find the distance between (7, -4) and (3, 2).

Answer 21

Question 22

Given two points, how do we find the midpoint M between them?

Answer 22

Question 23

The midpoint M of the line segment connecting (6, -7) and (2, 4) is:

Answer 23

Question 24

Find the point (x,y) of the line y = -2x that is equidistant from the points A(-3, -4). and B(6, 2).

Answer 24

Question 25

The equal distance from the center and all the points that make a circle is called the:

Answer 25

radius

Question 26

Twice the radius is called the:

Answer 26

diameter, it connects opposite points of a circle

Question 27

Let (h, k) denote the center, r the radius and (x, y) any point on the circle. Find the standard equation of a circle.

Answer 27

The distance from (h, k) and (x, y) is exactly r so:

Question 28

The standard equation of the distance r between the center and the points of a circle is: (x - 1)² + (y +2)² = 3, what would be the coordinates of the center and the radius?

Answer 28

Center : (1, -2)
Radius: √3

Question 29

What is the equation of the simplest circle of all circles?

Answer 29

x² + y² = 1 where the center is the origin (0, 0) and a radius of 1.

Question 30

What is a unit circle?

Answer 30

Any circle with a radius of 1.

Question 31

Find the equation of a circle that has (-5, -7) and (1, 1) as its endpoint of the diameter and the distance r between its center and a point.

Answer 31

Circle equation: r² = (x + 2)² + (y +3)²
r = 5

Question 32

Find the standard equation of a circle:
2x² + 12x + 2y² -8y +4 = 0
Identify its radius and its center.

Answer 32

r = √11
Center: (-3, 2)

Question 33

What is the definition of mathematical modeling?

Answer 33

Adding a numerical structure to a real-world situation

Question 34

Give an example of mathematical modeling.

Answer 34

Getting in a taxi cab and calculating the total cost of the fare taking into consideration the drop charge and the rate per mile.

Question 35

What is a linear function?

Answer 35

It is a graph that produces a straight line in the forms of f(x) = b +mx or f(x) = mx + b

Question 36

f (x) = b + mx is an increasing function if m ___ 0

Answer 36

m > 0

Question 37

f (x) = b + mx is an decreasing function if m ___ 0

Answer 37

m < 0

Question 38

Marcus currently owns 200 songs in his iTunes collection. Every month, he adds 15 new songs. Write a formula for the number of songs, N, in his iTunes collection as a function of the number of months, m. How many songs will he own in a year?

Answer 38

1 year = 12 months
N(12) = 200 + 15(12) = 380 songs
N(m) = 200 +15m

Question 39

The population of the city increased from 23,400 to 27,800 between 2002 and 2006. Find the rate of change of the population during this time span.

Answer 39

m = 1100 per year

Question 40

The pressure, P, in pounds per square inch (PSI) on a diver depends upon their depth below the water surface, d, in feet, following the equation P(d ) = 14.696 + 0.434d. Interpret the components of this function. (2)

Answer 40

The pressure on the diver increases by 0.434 PSI for each foot their depth increases.

The initial value, 14.696, will have the same units as the output, so this tells us that at a depth of 0 feet, the pressure on the diver will be 14.696 PSI.

Question 41

If f (x) is a linear function, f(3) = -2, and f(8) = 1, find an equation for the function.

Answer 41

f(x) = -19/5 + 3/5x

Question 42

Working as an insurance salesperson, Ilya earns a base salary and a commission on each new policy, so Ilya’s weekly income, I, depends on the number of new policies, n, he sells during the week. Last week he sold 3 new policies and earned $760 for the week. The week before, he sold 5 new policies and earned $920. Find an equation for I(n), and interpret the meaning of the components of the equation

Answer 42

I(n) = 520 + 80n
He starts at 520$ and earns 80 for each new policy.

Question 43

The balance in your college payment account, C, is a function of the number of quarters, q, you attend. Interpret the function C(q) = 20000 – 4000q in words. How many quarters of college can you pay for until this account is empty?

Answer 43

You have an initial balance of 20000 and it decreases at a rate of 4000$ per quarter.

After 5 quarters, your balance will be empty.

Question 44

Given the table below write a linear equation that represents the table values.

Answer 44

P(w) = 1000 + 40w

Question 45

Summarize these key concepts:
Definition of Mathematical Modeling
Definition of a linear function Structure of a linear function Increasing & Decreasing functions Finding the vertical intercept (0, b) Finding the slope/rate of change, m Interpreting linear functions

Question 46

When graphing a linear function, there are three basic ways to graph it: (3)

Answer 46

1) By plotting points (at least 2) and drawing a line through the points
2) Using the initial value (output when x = 0) and rate of change (slope)
3) Using transformations of the identity function f (x) = x

Question 47

Are the lines below perpendicular, parallel, or neither?

Answer 47

Neither

Question 48

The equation of the line that goes through the point (4,8) and is parallel to the line 3𝑥+2𝑦=4 can be written in the form 𝑦=𝑚𝑥+𝑏 where 𝑚 _______
b _______

Answer 48

m = -3/2
b = 14

Question 49

The equation of the line that goes through the point (15,37) and is parallel to the 𝑥-axis can be written in the form 𝑦=𝑚𝑥+𝑏 where
𝑚 _______
b _______

Answer 49

𝑚 = 0
b = 37

Question 50

An equation of a line through (5, 6) which is perpendicular to the line 𝑦=4𝑥+4 has slope
_____and
y-intercept of ______.

Answer 50

m = -1/4
b = 29/4

Question 51

For the pairs of lines defined by the following equations indicate with an “I” if they are identical, a “P” if they are distinct but parallel, an “N” (for “normal”) if they are perpendicular, and a “G” (for “general”) if they are neither parallel nor perpendicular.

Answer 51

I
N
G
P

Question 52

Find an equation of the circle with center at the origin and passing through (−1,6) in the form of (𝑥−𝐴)²+(𝑦−𝐵)²=𝐶 where 𝐴,𝐵,𝐶
are constant. Then:
A =
B =
C =

Answer 52

A = 0
B = 0
C = 37

Question 53

Find the standard form for the equation of a circle (𝑥−ℎ)² + (𝑦−𝑘)²= 𝑟²
with a diameter that has endpoints of (−7,7)
and (5,3).
h =
k =
r =

Answer 53

h = -1
k = 5
r =2*sqrt(10)

Question 54

Answer 54

Center (4, 4)
r = 1

Question 55

Find the center and radius of the circle whose equation is 2𝑥² −3𝑥 + 2𝑦² −8𝑦−1=0
.

Answer 55

Center of circle (0.75, 2)
radius = 2.25

Question 56

Find the point (𝑥,𝑦) on the line 𝑦=5𝑥−2 that is equidistant from the points (−3,6) and (1,6)

Answer 56

(-1, -7)

Question 57

A circle has a radius of √37 and is centered at (1.3,−3.5).
Write the equation.

Answer 57

(x−1.3)² +(y+3.5)² =37

Question 58

Answer 58

Question 59

Answer 59

Question 60

Answer 60