Answer:
The sequence 100, 50, 10, 5, 1, ... is NOT a geometric sequence because there is no single constant ratio that multiplies each term to get the next one.
The point (–1, 5)
(
–
1
,
5
)
is the solution to a system of linear equations. One of the equations is y=−2x+3
The equation of the line that passes through the given point (-1, 5) is y = -2x + 7.
The given point (–1, 5) is the solution to a system of linear equations.
One of the equations is y=−2x+3.
Let's discuss linear equations.
A linear equation is an algebraic equation that represents a straight line on the coordinate plane.
In the form y = mx + b,
where m is the slope and b is the y-intercept,
the general form of a linear equation is y = mx + b.
In the equation y = mx + b, m represents the slope of the line, and b represents the y-intercept of the line.
Now, let's find another equation of the given system of linear equations using the given point (-1, 5).
Given equation is y = -2x + 3.
Let's find the slope of the given equation.
Slope (m) = -2Therefore, the slope-intercept form of the equation is y = -2x + b.
To find b, substitute x = -1 and y = 5 in the above equation.
5 = -2(-1) + b Simplifying the above equation.
5 = 2 + b Adding 2 to both sides of the equation.
5 + 2 = b7 = b Therefore, the equation of the line that passes through the given point (-1, 5) is y = -2x + 7.
The system of linear equations is y = -2x + 3y = -2x + 7
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Find the first three terms of the arithmetic series. Given a1 = 11, an = 110 and Sn = 726.
Right triangle STD has a longer leg measuring exactly 3√5 cm. The altitude from right angle T to hypotenuse
SD cuts the hypotenuse into two segments where the shorter part is 1 less than the longer part. Find the exact
length of each part of the hypotenuse, SU and UD, the exact length of altitude TU and the exact length of ST.
Answer:
Let's call the length of the hypotenuse SD as x.
Since the altitude from T to SD divides SD into two parts, let the length of the shorter part be y. Then the length of the longer part is x-y.
Using similar triangles, we have:
TU/TS = ST/TD
Substituting the values we have:
TU/(3√5) = √5/UD
TU = (3/5)UD
Using the Pythagorean theorem in triangle TUS, we have:
TU² + (3√5)² = TS²
(3/5 UD)² + 45 = ST²
9/25 UD² + 45 = ST²
Using the Pythagorean theorem in triangle TUD, we have:
TU² + UD² = TD²
(3/5 UD)² + UD² = x²
9/25 UD² + UD² = x²
34/25 UD² = x²
UD² = (25/34)x²
Substituting the value of UD² in the equation ST² = 9/25 UD² + 45, we get:
ST² = 9/25 (25/34)x² + 45
ST² = 45/34 x² + 45
Since y = x-y-1, we have y = (x-1)/2.
Using the Pythagorean theorem in triangle TUD, we have:
(1/4) (x-1)² + UD² = x²
(1/4) (x² - 2x + 1) + (25/34)x² = x²
(1/4)(x²) + (25/34)x² - (1/2)x + (1/4) = 0
(59/68)x² - (1/2)x + (1/4) = 0
Using the quadratic formula, we get:
x = [1/2 ± √(1/4 - 4(59/68)(1/4))]/(2(59/68))
x = [1/2 ± (3√34)/17]/(59/34)
x = 17/59 ± 6√34/59
Since x is the hypotenuse SD, we have:
UD² = (25/34) x²
UD² = (25/34) [(17/59 ± 6√34/59)²]
UD² = 136/59 ± 204√34/295
Therefore, the exact lengths of the two parts of the hypotenuse are:
SD = x = 17/59 ± 6√34/59
SU = x-y = (x-1)/2 = 8/59 ± 3√34/59
UD = y = (x-1)/2 = 8/59 ± 3√34/59
TU = (3/5) UD = (3/5) [8/59 ± 3√34/59] = 24/295 ± 9√34/295
ST² = 45/34 x² + 45 = 45/34 [(17/59 ± 6√34/59)²] + 45
ST = √[45/34 [(17/59 ± 6√34/59)²] + 45]
When purchasing a car, the buyer must pay sales tax, a title fee, and a license fe
on a car purchase is 6.25% of the price of the car. The title fee is $18.50, and th
If the price of a new car is $24,000, determine the total owed for tax, title fee.
If the price of a new car is $24,000, the total owed for tax is $1,518.50.
What is tax?Tax is the money that the government collects from people and organizations for providing public services and infrastructure.
The total owed for tax on a $24,000 car purchase is calculated by multiplying the sales tax rate of 6.25% by the price of the car.
The result of this calculation is the sales tax portion of the total amount owed.
The title fee of $18.50 is added to this amount to get the total amount due for tax on the purchase of the car.
Mathematically, the equation for the total owed for tax is:
Total Tax = (6.25% x $24,000) + $18.50
Total Tax = ($1,500 + $18.50)
Total Tax = $1,518.50
Therefore, if the price of a new car is $24,000, the total owed for tax is $1,518.50.
This amount includes the sales tax portion of 6.25% of the car's price and a title fee of $18.50. This tax amount must be paid before the buyer can take possession of the car.
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Alia left to go on a camping trip at 12:55. She returned from the trip the following
day at the time shown on the following day at 10:40
How long was she away for?
Give your answer in hours and minutes.
Answer:
Step-by-step explanation: 12:55 she returned at 10:40 12:55 plus 5 minutes is 1:00 plus 9 hours and 40 minutes is 10:40 she was 9 hours and 45 minutes awayFind the value of x in the figure below
Consequently, x is 70 degrees as a consequence. The supplied diagram labels the angles of the triangle ABC as 40°, 70°, and x.
what is triangle ?Three straight lines that meet at three different locations to create a triangle, a two-dimensional geometric shape. Triangles have three sides and three vertices, which are the three places where those three lines intersect. Triangles can be categorised based on the dimensions of their angles and side lengths. . In contrast, a triangle with three equal sides and three equal angles of 60 degrees is called an equilateral triangle. The sides and angles of a scalene triangle are not identical.
given
The angles of the triangle ABC are labelled in the provided figure as 40°, 70°, and x. We can use the knowledge that the sum of a triangle's angles is 180° to find x.
As a result, we have:
x + 40° + 70° = 180°
The left half of the equation is simplified as follows:
x + 110° = 180°
110° from both edges subtracted:
x = 70°
Consequently, x is 70 degrees as a consequence. The supplied diagram labels the angles of the triangle ABC as 40°, 70°, and x.
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circle project represented in a graph
1. Draw a point at (1,-2).
2. Draw a long radius of 8 units.
3.Using a compass, draw a circle with your point from step one as its center and the point from step two as the side.
4.Using a protractor, draw a 70 degree arc
5. draw a central angle that intersects your arc
6. Draw an inscribed angle that intersects an arc of 40 degrees
7.draw a tangent line
8. draw a secant line
9. write the equation of your circle
Answer:
search up the answers
Step-by-step explanation:
Matt is organising an event. He buys some party bags and some toys for the party bags from a shop. The party bags are sold in packs. There are 105 party bags in each pack. Each pack costs £1.32 The toys are sold in packs. There are 84 toys in each pack. Each pack costs £4.15 Matt buys exactly the same number of party bags as toys. What is the least amount of money he could pay?
The least amount of money he could pay for the conditions that he will for the given information is = £ 3053.4
What about least amount?
In mathematics, the term "least amount" is not commonly used. However, a similar term that is often used is "minimum".
The minimum value of a set of numbers or a function is the smallest value within that set or function. For example, if we have the set of numbers {2, 5, 7, 8, 10}, the minimum value is 2.
Similarly, in the context of optimization problems, we often seek to find the minimum value of a function to achieve the best possible outcome. This can involve finding the minimum value of a cost function in order to minimize the cost of a process, or finding the minimum value of a profit function to maximize the profit of a business.
According to the given information:
Set the number of party bags pack as x , toy pack as y
Since, 105 party bags in a pack , £1.32
84 toys in a pack £4.15.
Hence, 105x = 84y , cost = 105x × 1.32x + 84y × 4.15 = 763.35x
Find the least common multiple
Hence, 84 × 5 = 420 , 105 × 4 = 420
x =4
y =5
least cost = 105 × 1.32 × 4 + 84×4.15 ×5
= £3053.4
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Write the slope-intercept form of the equation of the line described.
througt: (2,5), perp,to y=-1/2x-2
The slope-intercept form of the equation of the line described is y = 2x + 1.
How to determine an equation of this line?In Mathematics and Geometry, the point-slope form of a straight line can be calculated by using the following mathematical expression:
y - y₁ = m(x - x₁)
Where:
m represent the slope.x and y represent the points.Since the line is perpendicular to the other line that is represented by this equation y = -1/2(x) - 2, we have the following;
Slope (m) = -1/2.
Perpendicular line.
m₁ × m₂ = -1
-1/2 × m₂ = -1
m₂ = 2.
At data point (2, 5), a linear equation in slope-intercept form for this line can be calculated by using the point-slope form as follows:
y - y₁ = m(x - x₁)
y - 5 = 2(x - 2)
y = 2x - 4 + 5
y = 2x + 1
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WILL GIVE BRAINLIST TO BEST ANSWER
The population of a certain town was 10,000 at the start of the year 2000. Each year, people moving into town increase the population by a net 3%, while people moving out of town decrease it by 2%. In addition, births increase the population by 5% each year.
Write a Recursive expression f(n), that shows the population at the beginning of the year n, as a function of its population the preceding year, n-1. Support your answer.
The Recursive expression f(n), that shows the population at the beginning of the year n, as a function of its population the preceding year is
f(1) = 10 000f(n) = f(n - 1) * 1.06How to write the recursive expressionThe population at the beginning of the year is given as 10 000
Let P(n) be the population at the beginning of the year n,
where
n is a positive integer.
We can express P(n) in terms of P(n-1) as follows:
P(n) = P(n - 1) + 0.03P(n - 1) - 0.02P(n - 1) + 0.05P(n - 1)
= (1 + 0.03 - 0.02 + 0.05)P(n - 1)
= 1.06P(n - 1)
Therefore, the recursive expression that shows the population at the beginning of the year n as a function of its population the preceding year is:
f(n) = 1.06f(n - 1)
This recursive formula is derived from the fact that each year,
the population increases by 3% due to people moving in and decreases by 2% due to people moving out, the population increases by 5% due to birthsResulting in a total increase of 6% per year.
The formula expresses this increase as a multiplication of the previous year's population by a factor of 1.06, resulting in the population at the beginning of the current year.
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What is 3x+7y=11 equal to
(6,-1)
(1,-2)
(0,4)
The given equation 3x + 7y = 11 is equal to (1,-2).
The given equation is 3x + 7y = 11.
To find the solution of the equation, we need to consider the given options:
(6,-1)(1,-2)(0,4)
Now substitute each value of x and y in the given equation, we get,
If x = 6 and y = -13(3 × 6) + (7 × -1) = 18 - 7 = 11 ≠ 11
If x = 1 and y = -2(3 × 1) + (7 × -2) = 3 - 14 = -11 ≠ 11
If x = 0 and y = 4(3 × 0) + (7 × 4) = 0 + 28 = 28 ≠ 11
Therefore, the given equation 3x + 7y = 11 is equal to (1,-2).
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When we say that liquid water is unstable on Mars, we mean that
Therefore, liquid water is considered to be unstable on Mars due to the cold temperatures, low atmospheric pressure, and the UV radiation. All of these environmental factors make it difficult for liquid water to persist.
Liquid water is unstable on Mars due to its cold, dry environment. Because the atmospheric pressure is too low to hold liquid water, the water on Mars quickly evaporates, sublimates, and/or is broken down by the ultraviolet radiation in the atmosphere.
The average temperature of the surface of Mars is −63 °C, which is well below the freezing point of water. Because of this, liquid water cannot exist on the surface of Mars. When temperatures are slightly higher, water can exist as a liquid, but it cannot stay in this state for very long.
The atmosphere on Mars also does not contain enough pressure to sustain liquid water. Even when water vapor is present, it will quickly evaporate in the low-pressure environment. Additionally, the UV radiation in the Martian atmosphere will break down water molecules quickly.
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Solve the triangle ….?
that the sum of the angles in a triangle is 180 degrees: C = 180 - A - B
C = 180 - 15 - 120
C = 45 degrees.
What is triangle?A triangle is a geometrical shape that consists of three straight sides and three angles. It is a three-sided polygon, which means that it is a closed figure with three-line segments as its sides. The sum of the interior angles of a triangle is always equal to 180 degrees, which is a fundamental property of triangles. Triangles can have different shapes and sizes, and they can be classified based on their side lengths and angle measures. Some common types of triangles include equilateral triangles (where all three sides are equal), isosceles triangles (where two sides are equal), and scalene triangles (where all three sides are different lengths). Triangles are commonly used in mathematics, geometry, and various fields of science and engineering.
by the question.
To solve the triangle, we can use the Law of Cosines, which states that:
[tex]c^{2} = a^{2} + b^{2} -2abcos(c)[/tex]
where c is the length of the third side and C is the angle opposite to it.
Given that one side is 17 and the first angle is 15 degrees, we can use the Law of Sines to find the ratio of the remaining sides:
[tex]a/sin(A) = b/sin(B) = c/sin(C)[/tex]
where A and B are the known angles and a and b are the known sides.
Using this formula, we have:
[tex]a/sin(15) = b/sin(120)[/tex]
or
[tex]b=a/sin(15) = b/sin(120)[/tex]
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Psychologists are concerned that ____ personality tests are not easy to interpret and do not always produce consistent results because they are not standardized.
Psychologists have raised concerns about the accuracy and validity of ____ personality tests, as they are not standardized. This means that the same test administered to two different people can yield different results, making it difficult to interpret. Moreover, results may be inconsistent, meaning the same test administered at different times could produce different results. This lack of consistency can lead to inaccurate interpretations and can render the tests less useful. Furthermore, there is a lack of standardization of criteria and methodologies used to evaluate personality tests, which could lead to misinterpretations of results.
In order to address these issues, it is important to use standardized personality tests, which are tested and validated to ensure consistent and accurate results. This will ensure that the tests yield consistent results and can be interpreted accurately.
Additionally, researchers must adhere to established guidelines and criteria to ensure that the results are reliable and valid. This will enable professionals to confidently use the tests and make accurate interpretations of the results.
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Fill in the blanks basically find the missing value
Answer:
6 and 10
Step-by-step explanation:
first find what 1 min is in meters
1/3 is 8 so 8x3 = 1m which is 24
now divide based on the next two numbers
1/4 of 24 = 6
6x 1 = 6
now the next
24/12 = 2
2x5 = 10
these two results, 6 and 10, are the answers to the missing meter values
how much work does it take to pump all the water over the top edge of a cylindrical tank of radius 6 meters and height 14 meters that is filled with water to a depth of 5 meters? round to the nearest kilojoule.
The work required to pump all the water over the top edge of the cylindrical tank is approximately 83,500 kJ.
To calculate the work required to pump all the water over the top edge of the cylindrical tank, we need to determine the volume of the water in the tank and the force required to lift it to the top edge.
The volume of water in the tank can be found by multiplying the cross-sectional area of the tank by the depth of the water. Since the tank is cylindrical, the cross-sectional area is given by πr^2, where r is the radius of the tank. Therefore, the volume of water in the tank is:
V = πr^2h = π(6m)^2(5m) = 540π m^3
To lift the water to the top edge of the tank, we need to overcome the force of gravity acting on the water. The force required to lift an object of mass m against gravity is given by F = mg, where g is the acceleration due to gravity (9.81 m/s^2).
The mass of the water in the tank can be found by multiplying its volume by its density. The density of water is approximately 1000 kg/m^3. Therefore, the mass of the water in the tank is:
m = ρV = (1000 kg/m^3)(540π m^3) = 1.7 x 10^6 kg
The force required to lift the water to the top edge of the tank is:
F = mg = (1.7 x 10^6 kg)(9.81 m/s^2) = 16.7 x 10^6 N
To find the work required to lift the water, we need to multiply the force by the distance over which it acts. The distance is equal to the height of the water in the tank, which is 5 m.
Therefore, the work required to pump all the water over the top edge of the tank is:
W = Fd = (16.7 x 10^6 N)(5 m) = 83.5 x 10^6 J
Rounding to the nearest kilojoule, the work required is approximately 83,500 kJ.
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The total number of cookies,y, contained in x packages can be represented by the equation y = 24x. Which of the following graphs best represents this situation?
The graph for the linear equation y=24x, will be a straight line having coordinate (1,24) i.e. B.
What is a linear equation, exactly?
A linear equation is a first-degree algebraic equation in which each term is either a constant or the product of a constant and a single variable (degree 1). A linear equation is stated as y = mx + b, where y is the dependent variable, x is the independent variable, m is the line's slope, and b= y-intercept .
A linear equation's graph is a straight line. The line's slope decides how steep it is, and the y-intercept indicates where the line crosses the y-axis. Linear equations are used to model relationships between variables that are directly proportional to each other, such as distance and time, or cost and quantity.
Now,
Given equation is y=24x
then for x, y is
1, 24
2, 48
3, 72
4, 96
Hence, the graph will be as represented in option 2.
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Select hte correct answer.Consider the functions below.f(x) = 8x2 + x + 3g(x) = 4x2 – 1h(x) = 3x + 6a. over the interval [3, 5], the average rate of change of g and h is more than the average rate of change of f. b. over the interval [0, 2], the average rate of change of f and h is less than the average rate of change of g. c. as x approaches infinity, the values of g(x) and h(x) eventually exceed the value of f(x). d. as x approaches infinity, the value of g(x) eventually exceeds the values of both f(x) and h(x)
Thus, option (d) is the correct answer.
Option (d) as x approaches infinity, the value of g(x) eventually exceeds the values of both f(x) and h(x) is the correct option. Since the functions are:f(x) =[tex]8x² + x + 3g(x) = 4x² – 1h(x) = 3x + 6[/tex]
a) over the interval [3, 5], the average rate of change of g and h is more than the average rate of change of f.It is not possible to determine which of these functions has a higher average rate of change since they all have different derivatives.b) over the interval [0, 2], the average rate of change of f and h is less than the average rate of change of g.The average rate of change of f(x) = [tex]8x² + x + 3[/tex]over the interval [0, 2] is given by:f'(x) = 16x + 1The average rate of change of f(x) = 8x² + x + 3 over the interval [0, 2] is:
[tex]f(2) - f(0)/2 - 0= f(2) - f(0)/2 = [8(2)² + 2 + 3 - (8(0)² + 0 + 3)]/2 = [32 + 2 + 3 - 3]/2 = 34/2 = 17[/tex]
The average rate of change of h(x) = 3x + 6 over the interval [0, 2] is given by:h'(x) = 3The average rate of change of h(x) = 3x + 6 over the interval [0, 2] is:[tex]h(2) - h(0)/2 - 0= h(2) - h(0)/2 = [3(2) + 6 - (3(0) + 6)]/2 = 12/2 = 6[/tex]The average rate of change of g(x) = 4x² - 1 over the interval [0, 2] is given by:g'(x) = 8xThe average rate of change of g(x) = 4x² - 1 over the interval [0, 2] is:[tex]g(2) - g(0)/2 - 0= g(2) - g(0)/2 = [4(2)² - 1 - (4(0)² - 1)]/2 = 16 - 1/2 = 15/2[/tex]
Thus, it can be concluded that the average rate of change of g(x) > f(x) > h(x) over the interval [0, 2]c) as x approaches infinity, the values of g(x) and h(x) eventually exceed the value of f(x).It is not true since g(x) and h(x) both have leading coefficients of 4 and 3, respectively, and will eventually grow faster than f(x) with a leading coefficient of 8.d) as x approaches infinity, the value of g(x) eventually exceeds the values of both f(x) and h(x)The leading coefficient of g(x) = 4x² - 1 is 4, and as x approaches infinity, it will continue to grow faster than both f(x) = 8x² + x + 3 and h(x) = 3x + 6, which have leading coefficients of 8 and 3, respectively.
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65% of all students at a college still need to take another math class. if 46 students are randomly selected, find the probability that
The probability of selecting 46 students out of a college population where 65% still need to take another math class is 0.05433 or 5.433%.
The probability of selecting 46 students out of a college population of which 65% still need to take another math class can be calculated using the binomial probability formula. To calculate the probability, the following information is needed:
The total number of trials (N) or total number of studentsThe number of successes (r) or number of students who still need to take another math classThe probability of success (p) or 65%.
Using the binomial probability formula, we can calculate the probability of selecting 46 students out of a college population where 65% still need to take another math class as follows:
[tex]P(X=46) = (N!/((N-r)! * r!)) * (p^r) * (1-p)^(N-r)[/tex]
[tex]= (100!/((100-46)! * 46!)) * (0.65^46) * (1-0.65)^(100-46)[/tex]
[tex]= 0.05433[/tex]
Therefore, the probability of selecting 46 students out of a college population where 65% still need to take another math class is 0.05433 or 5.433%.
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A cylinder and a cone have the same diameter: 8 inches. The height of the cylinder is 3 inches. The height of the cone is 18 inches.
Use π = 3.14.
What is the relationship between the volume of this cylinder and this cone? Explain your answer by determining the volume of each and comparing them. Show all your work. (10 points)
Answer:
The formula for the volume of a cylinder is V = πr²h, where r is the radius and h is the height.
Given the diameter of both the cylinder and the cone is 8 inches, the radius is 8/2 = 4 inches.
The volume of the cylinder is Vcyl = π(4)²(3) = 48π cubic inches.
The formula for the volume of a cone is V = (1/3)πr²h.
The volume of the cone is Vcone = (1/3)π(4)²(18) = 96π/3 = 32π cubic inches.
Therefore, the relationship between the volume of the cylinder and the cone is that the volume of the cone is exactly two-thirds of the volume of the cylinder.
We can see this by dividing the volume of the cylinder by the volume of the cone:
Vcyl/Vcone = (48π) / (32π) = 3/2
So, the volume of the cylinder is 1.5 times greater than the volume of the cone.
If spun 100 times, how many would you predict to be white?
1. The probability of landing on red is 7/20.
2. I will predict 25 to be white.
3. I will predict 48 to be blue.
4. It will most likely land on red.
How many would you predict to be white?Probability deals with the study of random events. It involves determining the likelihood or chance of an event occurring, based on the information available.
The basic formula for probability is:
P(event) = number of favorable outcomes / number of possible outcomes
number of possible outcomes = 7 + 5 + 4 + 4 = 20
1) P(red) = number of red / number of possible outcomes
P(red) = 7/20
2) when spun 100 times:
number of white = P(white) * 100
number of white = 5/20 * 100 = 25
3) when spun 240 times:
number of blue = P(blue) * 100
number of blue = 4/20 * 240 = 48
4) That will be the color with highest probability. That is color red with probability of 7/20.
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If triangle ABC is a 30-60-90 degree triangle and we know the following
point A is (-4,-2)
point B is (4,-2)
then we must find point C. If the angle of C is 90 degrees and point C is in quadrant 1 then where is point C?
The coordinates of point C are (4, 2), which is located in quadrant 1.
In a 30-60-90 degree triangle, the side opposite the 30-degree angle is half the length of the hypotenuse, and the side opposite the 60-degree angle is √3/2 times the length of the hypotenuse. Since the side opposite the 30-degree angle is the shortest side, it must be the distance between points A and B, which is 8 units.
Let's call point C (x, y). Since angle C is 90 degrees, side AC is perpendicular to side AB, which means it is a vertical line that passes through point A. Similarly, side BC is perpendicular to side AB, which means it is a horizontal line that passes through point B.
Therefore, point C must lie on both the vertical line passing through A and the horizontal line passing through B. The equation of the vertical line passing through A is x = -4, and the equation of the horizontal line passing through B is y = -2. So we have the system of equations
x = -4
y = -2
Solving this system gives us the coordinates of point C: (-4, -2). However, this point is not in quadrant 1, as we desired.
To find a point C in quadrant 1, we need to flip the signs of the x and y coordinates of point C. So the coordinates of point C are (4, 2).
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Given that x = (5,-5) and y = (8,-3), find x•y
If x = (5,-5) and y = (8,-3), x•y is: 55.
How to find the vectors?The dot product (also called scalar product or inner product) of two vectors x = (x1, x2) and y = (y1, y2) is given by:
x•y = x1y1 + x2y2
Using the coordinates of the given vectors:
x = (5, -5)
y = (8, -3)
x•y = (5)(8) + (-5)(-3) = 40 + 15 = 55
Therefore, x•y = 55.
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andace had scores of 96, 84, 95, and 82 on her first four exams of the semester. what score must she obtain on the fifth exam to have an average of 90 or better for the five exams
Andace needs to score at least 98 on her fifth exam to have an average of 90 or better for the five exams.
To find out what score Andace needs to get on the fifth exam, we can use the formula for the average (also known as the mean):
Average = (sum of all scores) / (number of scores)
We know that Andace needs an average of 90 or better for the five exams. Therefore, the sum of all five scores must be at least 450 (90 multiplied by 5).
The sum of Andace's first four scores is:
96 + 84 + 95 + 82 = 357
To get an average of 90 or better for the five exams, Andace needs to get a total of:
450 - 357 = 93
on her fifth exam.
Since she has already taken four exams and the maximum score she can get on her fifth exam is 100, we can subtract her first four scores from 93 to find out what she needs to score on her fifth exam:
93 - 96 - 84 - 95 - 82 = -164
Since it's not possible for Andace to score a negative number on her fifth exam, we can conclude that she needs to score at least 98 (93 - 5) to have an average of 90 or better for the five exams.
In conclusion, Andace needs to score at least 98 on her fifth exam to have an average of 90 or better for all five exams.
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a university found that 10% of students withdraw from a math course. assume 30 students are enrolled. what is the probability that 5 or less will withdraw?
The probability that 5 or less students will withdraw from a math course if 30 students are enrolled is 0.6826.
This can be calculated using the binomial probability formula, which states that the probability of a certain number of successes in a certain number of trials is equal to the number of combinations of successes times the probability of each success. In this case, the probability of success (withdrawing) is 0.10 and the number of trials (students enrolled) is 30.
For this example, the probability of 5 or less successes (withdrawals) is calculated by adding together the probabilities of 0 successes, 1 success, 2 successes, 3 successes, 4 successes, and 5 successes. That gives us a probability of 0.6826.
This is equivalent to saying that 68.26% of students enrolled in a math course will not withdraw. It is also equivalent to saying that 31.74% of students enrolled in a math course will withdraw.
To illustrate this, if we assume that 30 students are enrolled in a math course, we would expect that approximately 19 students will not withdraw (68.26%) and approximately 11 students will withdraw (31.74%).
In conclusion, the probability that 5 or less students will withdraw from a math course if 30 students are enrolled is 0.6826.
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the doctor has ordered 1.25 mg/kg of a medication im. it the patient weighs 175 lbs. the drug on hand is available is a vial with 100 mg/2ml. (1) how many mg will be given? (2) calculate the amount to be injected.
1. The amount of medication to be given is 99.25 mg.
2.The amount of 1.985 mL medication should be injected.
To answer the given question, let's follow the steps mentioned below.
Determine the amount of medication to be given:1. Convert the weight of the patient from pounds to kilograms.
175 pounds = 79.4 kilograms
2. Multiply the patient's weight in kilograms by the ordered dosage.
1.25 mg/kg × 79.4 kg = 99.25 mg
Therefore, 99.25 mg of medication is required
Calculate the amount to be injected1. Find the number of milliliters (mL) required to deliver the medication dosage.
The concentration of the drug is 100 mg/2 mL.
100 mg/2 mL ÷ 1 = 50 mg/m
2. Divide the total amount of medication required by the concentration of the drug.
99.25 mg ÷ 50 mg/mL = 1.985 mL
Therefore, 1.985 mL of the medication should be injected.
Note:
1 kg = 2.2 poundsmg/mL = milligrams per millilitermL = millilitersFor similar question on medication.
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housing costs: a government report on housing costs says that single-family home prices nationwide are skewed to the right, with a mean of $235,700. a. we collect price data from a random sample of 50 homes in orange county, california. why is it okay to use these data for inference even though the population is skewed?
It is fine to use these data because the price sample is random so bias will not interfere with the results.
Why is it okay to use this data?Based on the information, we can infer that it is correct to use the data from this sample because it is random, that is, it does not have a defined order. Therefore, it is not necessary to take bias into account because it will not have any influence on the results.
In accordance with the above, it would be incorrect to take the data from a non-random sample because information would be prioritizing and this would cause the results to be blinded.
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(04.03 MC)
Find the area of the polygon.
A 41 square units
B 44 square units
C 52 square units
D 56 square units
The area of given polygon is 44 square units from the given graph.
What is Polygon ?
A polygon is a 2-dimensional geometric shape that is formed by joining a finite number of straight line segments to form a closed shape.
The area of each triangle can be found by using the formula:
Area = (base * height)/2
Triangle 1: Base = 4 units, Height = 5 units
Area of Triangle 1 = (4*5)/2 = 10 square units
Triangle 2: Base = 8 units, Height = 3 units
Area of Triangle 2 = (8*3)/2 = 12 square units
The area of the trapezoid can be found by using the formula:
Area = (Sum of parallel sides * Height)/2
Trapezoid: Height = 4 units, Parallel side 1 = 3 units, Parallel side 2 = 7 units
Area of Trapezoid = ((3+7)*4)/2 = 20 square units
Therefore, the total area of the polygon is:
Total Area = Area of Triangle 1 + Area of Triangle 2 + Area of Trapezoid
Total Area = 10 + 14 + 20 = 44 square units
Hence, The area of given polygon is 44 square units from the given graph.
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The angles of an irregular pentagon is x, 90, x, 150, x degrees.
Calculate the size of the largest angle.
Answer:
x=130°
Step-by-step explanation:
The sum of the angel of the pentagon is equal to 540°
X+90+x+150+x=540
3x+240=540
3x=540-150
3x=390
X=130
of the 36 students in richelle's class, 12 prefer chocolate pie, 8 prefer apple, and 6 prefer blueberry. half of the remaining students prefer cherry pie and half prefer lemon. for richelle's pie graph showing this data, how many degrees should she use for cherry pie?
Richelle should use 50 degrees for cherry pie in her pie chart.
The total number of students is 36.
The number of students who prefer chocolate pie is 12.
The number of students who prefer apple is 8.
The number of students who prefer blueberry is 6.
Half of the remaining students prefer cherry pie and half prefer lemon.
So we can calculate the number of students who prefer cherry pie by doing is 1/2 × (36 − 12 − 8 − 6) = 5
The number of students who prefer cherry pie is 5.
The number of students prefer lemon pie is also 5.
The formula for calculating the degrees of an angle in a pie chart is given by the formula given below:
Number of degrees is,
= (number of students who prefer cherry pie / total number of students) × 360°
= (5/36) × 360°= 50°
Thus, Richelle should use 50 degrees for cherry pie in her pie chart.
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