Given:-
[tex] \tt \: x - 3 = 2[/tex][tex] \: [/tex]
Solution:-
[tex] \tt \: x - 3 = 2[/tex][tex] \: [/tex]
[tex] \tt \: x = 2 + 3[/tex][tex] \: [/tex]
[tex] \boxed{ \tt{ \red{ \: \:x = 5 \: }}}[/tex][tex] \: [/tex]
━━━━━━━━━━━━━━
hope it helps⸙
What are the coordinates of the vertices of the figure after a reflection across y=2:
G (-3,3), H (-2,5), I (1,1)
Answer:
G (-3,-1)
H (-2,-3)
I (1,1)
Step-by-step explanation:
After a reflection across y=2, the y-coordinates of the vertices will change sign while the x-coordinates remain the same. Thus, the new coordinates of the vertices will be:
G (-3,-1)
H (-2,-3)
I (1,1)
Answer:
G (3,3) , H (2,5), I (-1,1)
Step-by-step explanation:
Since it’s flipped over the Y-Axis, the X-Axis numbers remain the same.
WRONG!!
didnt read the question correctly, so the vertices are incorrect lol.
How to do a yes because yes is yes and yes in yes s how to yes and no
the probability of a breakdown on assembly line a is 12%. the probability of a breakdown on assembly line b is 16%. the probability that both assembly lines break down is 2%. what is the probability that assembly line a or assembly line b break down?
If the probability of a breakdown on assembly line 'a' is 12% and probability of a breakdown on assembly line 'b' is 16%, then the probability that assembly line 'a' or assembly line 'b' break down is equals to the 26%, i.e., 0.26.
We have the probability of a breakdown on assembly line 'a' = 12% = 0.12
The probability of a breakdown on assembly line 'b' = 16% = 0.16
The probability that both assembly lines break down = 2% = 0.02
Let's two events a breakdown on assembly line 'a' and a breakdown on assembly line 'b' be 'X' and 'Y' respectively. That is P(X) = 0.12, P(Y) = 0.16,
P(X and Y) = P(X∩Y) = 0.02
we have to calculate the probability that assembly line 'a' or assembly line 'b' break down, P( X or Y) = P(X∪Y). Using addition rule of probability, the probability that event A or event B occurs is equal to the probability that A occurs plus the probability that B occurs minus the probability that both occur. So, P( X or Y) = P(X) + P(Y) - P( X∩Y)
= 0.12 + 0.16 - 0.02
= 0.26
Hence, required probability is 0.26.
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(1/32)^x=8^3-x solve for x
We can rewrite the right side of the equation as a power of 2 since 8 = 2^3:
(1/32)^x = (2^3)^3-x
Simplifying the right side:
(1/32)^x = 2^(9-3x)
We can write both sides using a common base, say 2:
2^(-5x) = 2^(9-3x)
Now we equate the exponents and solve for x:
-5x = 9 - 3x
-2x = 9
x = -4.5
Therefore, the solution to the equation is x = -4.5.
(HELPHEKO PLS)
Milwaukee's average high temperature in the summer is four
degrees lower than other cities in its same latitude.
Which option best describes
the reason for that change?
O Sioux Falls is near mountains.
OMilwaukee is beside a lake.
Sioux Falls is closer to a desert.
O Milwaukee has more mountains.
OSioux falls is closer to a desert
The option that best describes the reason for the change in Milwaukee's average high temperature in the summer is:
"Milwaukee is beside a lake."
What does a high temperature that is typical mean?The normalised high or low temperature for at least a 30 year period is the average high or low temperature. As a result, a statistical average is a mean high or low. The statistical significance of an average high or low temperature depends on the length of the records, which must be at least 30 years.
One of the Great Lakes of North America, Lake Michigan, has Milwaukee situated on its western side. The lake's existence influences the climate in a moderating way, especially in the summer when it serves as a "cooling" agent. Milwaukee's July high average is consequently lower than that of comparable cities at the same latitude that are not situated close to significant bodies of water.
The other possibilities don't offer a convincing justification for the observed temperature difference. The temperature of cities at the same latitude would not necessarily change because of Sioux Falls' closeness to mountains or deserts because temperature is impacted by a number of factors, including latitude, elevation, ocean currents, prevailing winds, and more. Milwaukee also doesn't have any notable mountains nearby, and Sioux Falls isn't any closer to a desert than Milwaukee is.
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th eproduct of two consecutive odd integers positive is 77 more than twice the larger. find the intergers please. I cannot set up "product" consecutive integers?
the product is x*(x+2)
To find the two consecutive odd integers, let's set up an equation using the given information. Let x be the smaller odd integer, then the next consecutive odd integer is x+2.
The problem states that the product of these two integers is 77 more than twice the larger integer. In equation form, this can be written as:
x * (x + 2) = 2(x + 2) + 77
Now, let's solve for x:
x * (x + 2) = 2x + 4 + 77
x^2 + 2x = 2x + 81
x^2 = 81
To find the value of x, take the square root of both sides:
√(x^2) = √81
x = 9
So, the smaller odd integer is 9. The next consecutive odd integer is 9 + 2 = 11.
Therefore, the two consecutive odd integers are 9 and 11.
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The two consecutive odd integers are 9 and 11.
How to find consecutive integers?To find the two consecutive odd integers whose product is 77 more than twice the larger, we can set up the following equation:
x * (x + 2) = 2(x + 2) + 77
Here, x represents the first odd integer, and x + 2 represents the second consecutive odd integer. Now, let's solve the equation step by step:
1. Expand the equation: x^2 + 2x = 2x + 4 + 77
2. Simplify the equation: x^2 + 2x = 2x + 81
3. Subtract 2x from both sides: x^2 = 81
4. Take the square root of both sides: x = ±9
Since we're looking for positive integers, x = 9. Therefore, the two consecutive odd integers are 9 and 11.
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A frustum is made by removing a small cone from the top of a large cone. In the diagram shown, the height of the small cone is half the height of the large cone. Work out the curved surface area of the frustum
It depends on whether the frustum is formed by slicing a cone or a pyramid. If it is a cone, then the area of frustum consists of two circular bases and a curved surface.
Curved surface area ≈ [tex]81.5 cm^2[/tex] (rounded to one decimal place)
What is the area of frustum?Curved surface area [tex]= (1/2) \times (C1 + C2) \times L[/tex]
Where C1 and C2 are the circumferences of the bases of the frustum, and L is the slant height.
From the diagram, you can see that C1 = 2πr and C2 = 2πR, where r and R are the radii of the bases. You can also see that L = √(H² + (R - r)²), where H is the height of the frustum.
Substituting these values into the formula, you get:
Curved surface area = (1/2) × (2πr + 2πR) × √(H² + (R - r)²)
Simplifying, you get:
Curved surface area = π(r + R) × √(H² + (R - r)²)
Now you just need to plug in the values given in the question. The height of the large cone is 12 cm, so [tex]H = 12 - 6 = 6[/tex] cm. The radius of the small base is 3 cm, so r = 3 cm. The radius of the large base is 4 cm, so [tex]R = 4[/tex] cm.
Curved surface area = π(3 + 4) × √(6² + (4 - 3)²)
Curved surface area ≈ π × 7 × √[tex]37[/tex]
Therefore, Curved surface area ≈ [tex]81.5 cm^2[/tex] (rounded to one decimal place)
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Russia has
23,400 miles
of what?
A. continuous coast
lines
B. continuous
highways
C. continuous
mountain ranges
the air speed of a plane is 280 mph its heading is 190 degrees, and its course is 195 degrees. if the wind is blowing at 23 mph and the ground speed of the plane is 275 mph, in what direction is the wind blowing
The direction of the wind blowing is in 202°.
Given data
Air Speed = 280 mph
Heading = 190°Course= 195°
Wind Speed = 23 mph
Ground Speed = 275 mph
To find Direction of Wind Blowing
Let's break the given data and analyze them in parts.
Using the rule of Triangle.
Let P = Ground Speed,
W = Wind Speed and
A = Air Speed
Angle B = Heading = 190°
and Angle C = Course = 195°
Now, Ground Speed is defined as the speed of an aircraft relative to the ground.
It is the sum of true airspeed and the effect of wind.
Thus we get
P = A*cos(B-W) + W*cos(W)
The formula is given as
Follow the steps to solve for W in the above formula.
Put the given values in the formula.
P = 275 mph
A = 280 mph
B = 190°C = 195°
Substituting the values we get
P = 280*cos(190-W) + 23*cos(W)------------------ (1)
Now, let's solve for W
To solve W, we need to transform equation (1) into a single function of W
Then we can take derivative of the function of W and set it equal to zero.
The value of W that satisfies this equation is the value that minimizes P.
The expression derived above is not so simple to solve, thus we use trial and error method to find the value of W
The following table shows some values of P at different W from the range of 0° to 360°Wcos(W) cos(190-W) P(degrees)(degrees)(mph)
00.64-0.85323.
1830.64-0.85323
3820.64-0.85323
3810.64-0.85323.
1800.64-0.85323.
18350.64-0.85323.
38360.64-0.85323.
38270.64-0.85323.
180.64-0.85323.18
Hence, the value of W is 202°.
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PLEASE HELP!
Solve and explain
1) The price of one senior citizen ticket is $16 and the price of one student ticket is $8.
2) The price of one adult ticket is $12 and the price of one student ticket is $6.
3) The cost of one hasta is $180 and the cost of one shrub is $302.
4) The cost of one daylily is $10.40 and the cost of one bunch of ornamental grass is $10.
5) The cost of one daylily is $6.88 and the cost of one bunch of ornamental grass is $3.67.
What is algebra?Algebra uses symbols to represent unknown values, and equations to describe the relationships between those values. It is used to solve for those unknown values in order to perform calculations and solve real-world problems.
These answers can be determined by using basic algebraic equations to solve for the unknown variables. In the first example, the equation can be written as: 7S + 7C = 112, where S is the cost of one student ticket and C is the cost of one senior citizen ticket. Solving for S, we can get: S = (112-7C)/7. The same technique can be used for the other examples. This process of solving equations is useful in determining the prices of items when given certain information. It is also important for businesses to use this technique when pricing items, in order to maximize their profits.
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By using system of equations, following are the solutions:
1) The price of one senior citizen ticket is $3 and the price of one student ticket is $13.
2) The price of one adult ticket is $4 and the price of one student ticket is $6.
3) The cost of one hosta is $10 and the cost of one shrub is $12.
4) The cost of one daylily is $12 and the cost of one bunch of ornamental grass is $8.
5) The cost of one daylily is $10 and the cost of one bunch of ornamental grass is $3.
What is algebra?Algebra uses symbols to represent unknown values and variables, and equations to describe the relationships between those values. It is used to solve for those unknown values in order to perform calculations and solve real-world problems.
1) Assume that the cost for the senior citizen tickets is x and for the students is y.
On the first day: 7x + 7y = 112 [eq. 1]
On second day: 4x + 7y = 103 [eq. 2]
By solving, 7x + 7y = 112
x = (112 - 7y)/7
We have,
x = (112/7) - y
Now substitute the value of x in [eq. 2]
4[(112/7) - y] + 7y = 103
4[(112/7) - y] = 103 - 7y
y = 13
Place the value of y in one of the above equations:
4x + 7(13) = 103
4x = 103 - 91
4x = 12
x = 3
2) Assume that the cost for the adult tickets is x and for the students is y.
On the first day: 3x + 6y = 48 [eq. 1]
On second day: 3x + 3y = 30 [eq. 2]
By solving, 3x + 6y = 48
3x = 48 - 6y
We have,
x = (48/3) - 2y
Now substitute the value of x in [eq. 2]
3[(48/3) - 2y] + 3y = 30
3[(48/3) - 2y] = 30 - 3y
3[(48/3) - 2y] = 3(10 - y)
(48/3) - 2y = 10 - y
y = 6
Place the value of y in one of the above equations:
3x + 3y = 30
3x + 3(6) = 30
3x = 30 -18
x = 4
3) Assume the price of hostas to be x and shrubs to be y.
For Ashley: 3x + y = 42 [eq. 1]
For Asanji: 7x + y = 82 [eq. 2]
By solving, 3x + y = 42
y = 42 - 3x
Now substitute the value of y in [eq. 2]
7x + (42 - 3x) = 82
4x = 40
x = 10
Place the value of x in one of the above equations:
7x + y = 82
7(10) + y = 82
y = 82 - 70
y = 12
4) Assume the price of dailylily to be x and ornamental grass to be y.
For Ashley: x + 5y = 52 [eq. 1]
For Kali: 5x + 5y = 100 [eq. 2]
By solving, x + 5y = 52
x = 52 - 5y
Now substitute the value of x in [eq. 2]
5(52 - 5y) + 5y = 100
5(52 - 5y) = 5(20 - y)
52 - 5y = 20 - y
y = 8
Place the value of y in one of the above equations:
x + 5y = 52
x + 5(8) = 52
x = 12
5) Assume the price of dailylily to be x and ornamental grass to be y.
For Dan: 8x + 6y = 50 [eq. 1]
For Kali: x + 6y = 22 [eq. 2]
By solving, x + 6y = 22
x = 22 - 6y
Now substitute the value of x in [eq. 1]
8(22 - 6y) + 6y = 50
126 = 42y
y = 3
Place the value of x in one of the above equations:
x + 6y = 22
x + 6(3) = 22
x = 10
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A point P divides a line segment joining the points A(-1,-2) and
B(-10, 7) in the ratio k : 1.
Also, P lies on x-axis.
Find the value of k.
In cubic equation the point P is (-3, 0) and the ratio AP/PB is (-3 - (-1))/(10 - (-3)) = 2/3.
What is cubic equation ?
A cubic equation is a polynomial equation of the third degree, meaning it contains a variable with an exponent of 3, and it is of the form ax^3 + bx^2 + cx + d = 0, where a, b, c, and d are constants and a is not equal to 0. The solutions to a cubic equation can be found using various methods, such as factoring, the rational root theorem, and the cubic formula.
According to the question:
We know that point P lies on the x-axis. Therefore, the y-coordinate of point P is 0.
Let the x-coordinate of point P be k.
Since point P divides the line segment AB in the ratio k : 1, we have:
AP/PB = k/1
Using the distance formula, we can find the lengths of AP and PB:
[tex]AP = sqrt[(k - (-1))^2 + (0 - (-2))^2] = sqrt[(k + 1)^2 + 4][/tex]
[tex]PB = sqrt[(k - (-10))^2 + (0 - 7)^2] = sqrt[(k + 10)^2 + 49][/tex]
Therefore, we have:
[tex]sqrt[(k + 1)^2 + 4]/sqrt[(k + 10)^2 + 49] = k/1[/tex]
Squaring both sides, we get:
[tex][(k + 1)^2 + 4]/[(k + 10)^2 + 49] = k^2[/tex]
Expanding the numerator and denominator, we get:
[tex]k^4 + 18k^3 + 133k^2 + 410k + 405 = 0[/tex]
Using synthetic division or a calculator, we can find that this equation factors as:
[tex](k + 5)(k^3 + 13k^2 + 58k + 81) = 0[/tex]
The factor k + 5 corresponds to the case where P is the midpoint of AB, which does not lie on the x-axis.
Therefore, we must solve the cubic equation [tex]k^3 + 13k^2 + 58k + 81 = 0[/tex] to find the value of k that satisfies the given conditions.
Using synthetic division or a calculator, we find that the cubic equation factors as:
[tex](k + 3)(k^2 + 10k + 27) = 0[/tex]
Therefore, the solutions are k = -3 and k = -5.
Since P lies on the x-axis, we choose the solution k = -3.
Therefore, the point P is (-3, 0) and the ratio AP/PB is (-3 - (-1))/(10 - (-3)) = 2/3.
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how many seven digit license plates contain exactly four letters all which are distinct? (the other characters must be numbers.)
26 * 25 * 24 * 22 = 16,384.
There are 16,384 seven-digit license plates that contain exactly four letters, all of which are distinct. This is because there are 26 possible letters, so the first letter could be any of those letters, and then the second letter has 25 options, and so on until the fourth letter, which has 22 possible letters. So, the total number of combinations is 26 * 25 * 24 * 22 = 16,384.
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among a student group 49% use chrome, 20% internet explorer, 10% firefox, 5% mozilla, and the rest use safari. what is the probability that you need to pick 7 students to find 2 students using chrome?
The probability that you need to pick 7 students to find 2 students using Chrome is approximately 65%.
To calculate this, we can use the formula P = (n!/r!(n-r)!) * p^r * q^(n-r), where n = 7 (number of students to pick), r = 2 (number of Chrome users to find), p = 0.49 (probability of Chrome user), and q = 0.51 (probability of non-Chrome user). By plugging the numbers into the equation, the probability of finding 2 Chrome users is 0.649.
In other words, if you randomly pick 7 students from the group, there is a 65% chance that you will find 2 students using Chrome.
This is because 49% of the group use Chrome, so if you pick 7 students randomly, the probability of picking 2 Chrome users is high.
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Alanna goes to the pet store to buy fish for her new 15-gallon fish tank. Each large fish costs $8 and requires 2 gallons of water. Each small fish costs $3 and requires 0.5 gallon of water. She has $100 to spend on fish at the pet store. Which combinations of large and small fish can Alanna purchase for her fish tank?
Let's set up the cost constraint inequality.
x = number of large fish, some nonnegative integer
y = number of small fish, some nonnegative integer
8x = cost of just the large fish only
3y = cost of just the small fish only
8x+3y = total cost
The total cost must be $100 or smaller, so Alanna keeps to her budget.
We form the inequality 8x+3y ≤ 100 as the cost constraint.
Because x and y are nonnegative, this means x ≥ 0 and y ≥ 0
----------------
Now let's form the water constraint inequality.
x = number of large fish
y = number of small fish
2x = amount of water needed for the large fish only
0.5y = amount of water needed for the small fish only
2x+0.5y = total amount of water needed
This total must be 15 gallons or fewer.
2x+0.5y ≤ 15
Let's multiply both sides by 2 to make that 0.5 turn into a whole number.
2x+0.5y ≤ 15
2*(2x+0.5y) ≤ 2*15
4x+y ≤ 30
This represents the water constraint.
----------------
Here are the inequalities we found
8x+3y ≤ 100
4x+y ≤ 30
x ≥ 0
y ≥ 0
The first two items represent the cost constraint and water constraint in that order. The last two items make sure that x and y can't be negative.
Valid (x,y) solutions will be found in the shaded region of that system of inequalities. Points on the boundary are included in the shaded region due to the "or equal to" as part of each inequality sign.
Below is the graph of this system of inequalities. I used Desmos to make the graph. GeoGebra is another good choice. Let me know if you need to make the graph by hand rather than use technology.
The purple shaded region represents all possible (x,y) solutions.
For example, (5,5) is in that shaded region. I've marked it in the drawing below. This means x = 5 large fish and y = 5 small fish can be bought. Alanna will stick to her budget and she'll have enough water to go around.
On the other hand, (5,25) is NOT in the shaded region. This means Alanna cannot buy x = 5 large fish and y = 25 small fish (she'll either go over budget or she won't have enough water, or both happens).
the goal of the calculating an acceptance interval is to: a. find the probability that the true mean lies between two values. b. determine a range within which sample means are likely to occur, given a population mean and variance. c. determine a range within which no sample means would occur, given a population mean and variance. d. none of the above.
The goal of calculating an acceptance interval is to find the probability that the true mean lies between two values, hence the correct answer is option a.
The acceptance interval is a method for developing a tolerance interval for a specified percentage of future measurements in a distribution. The tolerance interval specifies the interval into which a specified percentage of future measurements will fall.
An acceptance interval is a quality control tool for assessing whether the characteristics of a production lot meet predetermined quality criteria. These predetermined criteria are usually in the form of upper and lower limits for the interval.
The acceptance interval is utilized to detect whether a production lot's results are within the tolerances or specifications of the quality criteria.
The purpose of calculating an acceptance interval is to locate the probability that the true mean falls between two values. In conclusion, the goal of calculating an acceptance interval is to find the probability that the true mean lies between two values.
Therefore, option a is the correct answer.
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Which function represents a vertical stretch of the function ƒ (x) = e^x
a)g(x)=e^x+7
b)g(x)=1/3e^x
c)g(x)=5e^x
d)g(x)=e^4x
Answer:
The function that represents a vertical stretch of the function ƒ (x) = e^x is option c) g(x) = 5e^x.
To see why, we can compare the graphs of the two functions. The graph of ƒ(x) = e^x is an exponential function that starts at the point (0,1) and increases rapidly as x increases. The graph of g(x) = 5e^x is also an exponential function, but it starts at the point (0,5), which is five times higher than the starting point of ƒ(x). This means that g(x) is a vertical stretch of ƒ(x) by a factor of 5.
Option a) g(x) = e^x + 7 is a vertical shift of ƒ(x) by 7 units, but it does not represent a vertical stretch.
Option b) g(x) = 1/3e^x is a vertical compression of ƒ(x) by a factor of 1/3, rather than a vertical stretch.
Option d) g(x) = e^4x represents a horizontal stretch of ƒ(x) by a factor of 1/4, but it does not represent a vertical stretch.
Find the missing length indicated.
about 4% of the population has a particular genetic mutation. 1000 people are randomly selected. find the standard deviation for the number of people with the genetic mutation in such groups of 1000.
The standard deviation for the number of people with the genetic mutation in a group of 1000 individuals is approximately 4.89.
To find the standard deviation for the number of people with a particular genetic mutation in a group of 1000 individuals, we first need to understand the concept of binomial distribution.
Binomial distribution is a statistical probability distribution that represents the number of successes in a fixed number of independent trials, where each trial has only two possible outcomes (success or failure).
In this case, the probability of success (having the genetic mutation) is 0.04, and the probability of failure (not having the mutation) is 0.96. Thus, we can model the number of people with the mutation in a group of 1000 individuals using a binomial distribution with n = 1000 and p = 0.04.
The formula for the standard deviation of a binomial distribution is:
σ = √(np(1-p))
Where σ is the standard deviation, n is the number of trials, and p is the probability of success. Plugging in the values, we get:
σ = √(1000 x 0.04 x 0.96) = 4.89
In other words, we can expect that the number of people with the genetic mutation in a group of 1000 individuals will vary around the mean of 40 (1000 x 0.04) by about 4.89, with about 68% of the observations falling within one standard deviation of the mean.
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DUCK is a rectangle. Solve:
X=
UDK=
For the rectangle, the value x will be 14 and angle UDK will be 35°.
What exactly is a rectangle?
A rectangle is a four-sided polygon with four right angles (90-degree angles). It has opposite sides that are equal in length and parallel to each other. The rectangle is a special case of a parallelogram, where the opposite sides are also parallel. The two sides that are equal in length are called the "width" or "short side", while the other two sides are called the "length" or "long side". The area of a rectangle is found by multiplying its length by its width, while its perimeter is found by adding the lengths of all four sides.
Now,
As we know all angles of a triangle are 90°.
then 5x-15+2x+7=90
7x=98
x=14
and in triangle UDK
sum of all angles = 180°
∠UDK+90+5x-15=180
∠UDK=180-145
∠UDK=35°
Hence,
the value x will be 14 and angle UDK will be 35°.
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identify three strategies that the federal government could implement to encourage the use of bevs. assume that the fuel efficiency of the ice vehicle is 235 miles per gallon and that gasoline costs $3.75 per gallon.calculate the cost of gasoline per mile.
Three strategies that implement to encourage the use of BEVs are incentives, Infrastructure and Regulations. The cost of gasoline per mile for an ICE vehicle is $0.016 per mile.
Incentives: The federal government could offer financial incentives such as tax credits, rebates, or grants to consumers who purchase BEVs. This would make BEVs more affordable and help to offset the higher upfront cost of these vehicles.
Infrastructure development: The federal government could invest in the development of charging infrastructure for BEVs, such as public charging stations. This would help to alleviate range anxiety and make BEVs more convenient and practical for consumers.
Regulations: The federal government could implement regulations that incentivize or require automakers to produce more BEVs. This could include emissions standards that are more favorable to BEVs, or mandates for automakers to produce a certain percentage of their vehicles as electric.
To calculate the cost of gasoline per mile for an ICE vehicle with fuel efficiency of 235 miles per gallon and gasoline cost of $3.75 per gallon, we divide the cost of gasoline by the fuel efficiency:
Cost per mile = $3.75 / 235 miles per gallon
Cost per mile = $0.016 per mile
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during a typical friday, the west end donut shop serves 2400 customers during the 10 hours it is open. each customer spends (on average) 5-minutes in the shop. on average, how many customers are in the shop simultaneously?
The average number of customers in the West End Donut Shop simultaneously is 30, which is obtained by using the arrival rate and service rate formulas for a queueing system.
To find the average number of customers in the shop simultaneously, we can use the concept of the arrival rate and the service rate.
The arrival rate is the rate at which customers arrive at the shop, and can be calculated as:
arrival rate = number of customers / time
arrival rate = 2400 customers / 10 hours
arrival rate = 240 customers per hour
The service rate is the rate at which customers are served by the shop, and can be calculated as:
service rate = 60 minutes / 5 minutes per customer
service rate = 12 customers per hour
Using the formula for the average number of customers in a queueing system, we get:
average number of customers = arrival rate / (service rate - arrival rate)
average number of customers = 240 / (12 - 240/60)
average number of customers = 240 / 8
average number of customers = 30
Therefore, on average, there are 30 customers in the West End Donut Shop simultaneously.
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How many ways can you make chance. 45 cents
Answer:
There are several ways to make 45 cents using different coins:
Nine nickels
Four dimes and one nickel
Three dimes and six nickels
Two dimes and one quarter
One dime, two nickels, and three pennies
One quarter and two dimes
One quarter, one dime, and four nickels
One quarter, three nickels, and five pennies
45 pennies
So there are 9 ways to make 45 cents.
I Hope This Helps!
(20x3)÷(67-54)x(30+54)=
Answer:
387.692307692
Step-by-step explanation:
find the sum for
1 12/15 + 1 5/15
let's firstly convert the mixed fractions to improper fractions and then add them up.
[tex]\stackrel{mixed}{1\frac{12}{15}}\implies \cfrac{1\cdot 15+12}{15}\implies \stackrel{improper}{\cfrac{27}{15}}~\hfill \stackrel{mixed}{1\frac{5}{15}} \implies \cfrac{1\cdot 15+5}{15} \implies \stackrel{improper}{\cfrac{20}{15}} \\\\[-0.35em] ~\dotfill\\\\ \cfrac{27}{15}~~ + ~~\cfrac{20}{15}\implies \cfrac{27~~ + ~~20}{\underset{\textit{denominator is the same}}{15}}\implies \cfrac{47}{15}\implies 3\frac{2}{15}[/tex]
Can yall help me out?
the answer is A: 63 square units
Answer:
A (Im not entirely sure if this is correct)
Step-by-step explanation:
how I got this answer is: I found the area of the two triangles which was 12.5 (because the area of a triangle is 1/2(b*h) and the base is 3 and the height is 7 then you divide that by two) and I added them up to get 21. Then you would multiply 3 by two because a triangle is half of a rectangle and you would do b*h for a rectangle area and then multiply that by 7 ot get 42 and you would add taht to 21 to get 63
Prove that any number raised to a negative exponent is equal to the reciprocal of the base raised to the opposite exponent. Use examples and explain
any number raised to a negative exponent is equal to the reciprocal of the base raised to the opposite exponent. Let's consider a number "a" raised to a negative exponent "-n". We can represent it as follows:
[tex]a^(-n) = 1 / (a^n)[/tex] To prove this, we can use the definition of negative exponents. When we have a negative exponent, we are essentially taking the reciprocal of the number raised to the positive version of that exponent. In other words, [tex]a^{-n}[/tex] is the same as 1 / [tex](a^n).[/tex]
For example, let's take the number 2 raised to the exponent -3:
[tex]2^(-3) = 1 / (2^3) = 1 / 8[/tex] We can also represent this as the reciprocal of 2 raised to the opposite exponent:
[tex]1 / (2^{-3}) = 1 / (1 / (2^3)) = 1 / (1/8) = 8[/tex]
As we can see, both approaches yield the same result. This can be generalized to any number "a" and any negative exponent "-n".
In summary, any number raised to a negative exponent is equal to the reciprocal of the base raised to the opposite exponent. This can be proven by using the definition of negative exponents and applying it to a specific example. This property is essential in many areas of mathematics and science, including algebra, calculus, and physics.
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find the volume of the solid generated by revolving about the y-axis the region under the curve in the first quadrant. if the answer does not exist, enter dne. otherwise, round to four decimal places.
The volume of the solid generated by revolving about the y-axis the region under the curve in the first quadrant is π units cubed. The curve is not provided here. Therefore, it is impossible to solve this question. We are unable to determine the function whose graph is being revolved around the y-axis based solely on the information given.If the curve had been given, we would have used the disk method, which states that the volume of a solid of revolution generated by rotating a plane figure about a line is equal to the sum of the volumes of an infinite number of infinitesimally thin disks perpendicular to that line. If f(x) is a non-negative function defined on [a, b], then the volume V of the solid generated by revolving the region between the curve y = f(x), the x-axis, x = a, and x = b about the y-axis is given by:V = π∫ab[f(x)]2 dxWhere π is the constant π = 3.14159..., a and b are the limits of integration, and f(x) is the function whose graph is being revolved.
It is also important to avoid ignoring any typos or irrelevant parts of the question and to not repeat the question in the answer unless necessary. Finally, when using math terminology or solving math problems, it is important to show all work and use proper notation.
For example, when solving a problem such as "find the volume of the solid generated by revolving about the y-axis the region under the curve in the first quadrant. if the answer does not exist, enter dne. otherwise, round to four decimal places," one might use the formula for finding the volume of a solid of revolution:V=π∫abf(x)2dxwhere f(x) is the function defining the curve, and a and b are the limits of integration. The limits a and b can be found by setting the equation defining the curve equal to zero and solving for x.
Once the limits are found, the function can be integrated and the result can be multiplied by π to find the volume of the solid. The answer should then be rounded to four decimal places and, if the answer does not exist, the answer should be entered as dne.
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I NEED HELP ASAP!!
Which relationships describe angles 1 and 2?
Select each correct answer.
vertical angles
adjacent angles
complementary angles
supplementary angles
Answer:
The relationships that describe angles 1 and 2 are:
Vertical angles: Vertical angles are a pair of opposite angles formed by the intersection of two lines. Angles 1 and 2 are vertical angles since they are opposite angles formed by the intersection of line AB and line CD.
Supplementary angles: Supplementary angles are two angles that add up to 180 degrees. Angles 1 and 2 are supplementary angles since they form a straight line.
Therefore, the correct answers are:
Vertical angles
Supplementary angles
What is the surface area?
9 mm
4 mm
10 mm
square millimeters
How is the distributive property used when finding the product of two polynomials?