The three functions that are not linear are b., c., and d. because they include a constant that shifts the graph, both addition and subtraction of constants, and an exponent, respectively.
A linear function is a function where the rate of change between the independent variable (x) and the dependent variable (y) is constant. In other words, if you were to graph a linear function, it would form a straight line.
Looking at the given functions, we can determine which ones are not linear.
Function b. is not linear because it includes a constant (-2) which would cause the graph to shift downwards. The graph of a linear function cannot shift upwards or downwards, it can only shift left or right.
Function c. is not linear because it includes both addition and subtraction of constants. This means that the rate of change is not constant and the graph would not form a straight line.
Function d. is not linear because it includes an exponent (2) which causes the rate of change to increase. Linear functions have a constant rate of change, so the inclusion of an exponent would cause the graph to form a curve, not a straight line.
Functions a., e., and f. are all linear because they have a constant rate of change and do not include any non-linear elements like exponents or constants that would shift the graph.
So, b., c., and d are not linear.
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please help
Write a system of equations to describe the situation below, solve using substitution, and fill in the blanks.
The student council at Lakewood High School is making T-shirts to sell for a fundraiser, at a price of $11 apiece. The costs, meanwhile, are $10 per shirt, plus a setup fee of $54. Selling a certain number of shirts will allow the student council to cover their costs. What will the costs be? How many shirts must be sold?
Answer:
The system of equations to describe the situation is:
* $10x + 54 = 11y$
* $y = 11x$
To solve using substitution, we can substitute the second equation into the first equation. This gives us:
* $10x + 54 = 11(11x)$
* $10x + 54 = 121x$
* $-11x = -54$
* $x = 5$
We can then substitute this value of $x$ into the second equation to solve for $y$. This gives us:
* $y = 11(5)$
* $y = 55$
Therefore, the student council will need to sell 55 T-shirts to cover their costs. The costs will be $54 + $10(55) = $604.
Here is the solution in a table format:
| Variable | Value |
|---|---|
| $x$ | 5 |
| $y$ | 55 |
| Cost | $604 |
I hope this helps!
Step-by-step explanation:
2. Elasticity of Demand: Consider the demand function given by q = D(x) = 460 – x a) Find the elasticity. b) Find the elasticity at x = 103, stating whether demand is elastic or inelastic. c) Find tFind the elasticity at x = 205, stating whether demand is elastic or inelastic
To find the elasticity of demand for the function q = D(x) = 460 - x, we can use the formula:
Elasticity = (% change in quantity demanded) / (% change in price)
a) Since the demand function given does not include a price variable, we can assume that price is constant. Therefore, the elasticity of demand for this function is constant and equal to -1.
b) To find the elasticity at x = 103, we need to calculate the percentage change in quantity demanded when x increases from 103 to 104.
At x = 103, quantity demanded is q = D(103) = 460 - 103 = 357.
At x = 104, quantity demanded is q = D(104) = 460 - 104 = 356.
The percentage change in quantity demanded is:
(% change in quantity demanded) = [(new quantity - old quantity) / old quantity] x 100
= [(356 - 357) / 357] x 100 = -0.28%
Since the elasticity of demand is -1, we can say that demand is inelastic at x = 103.
c) To find the elasticity at x = 205, we need to calculate the percentage change in quantity demanded when x increases from 205 to 206.
At x = 205, quantity demanded is q = D(205) = 460 - 205 = 255.
At x = 206, quantity demanded is q = D(206) = 460 - 206 = 254.
The percentage change in quantity demanded is:
(% change in quantity demanded) = [(new quantity - old quantity) / old quantity] x 100
= [(254 - 255) / 255] x 100 = -0.39%
Since the elasticity of demand is -1, we can say that demand is inelastic at x = 205.
Hi! I'd be happy to help you with your question on elasticity of demand.
a) To find the elasticity, we first need the formula for price elasticity of demand (PED), which is:
PED = (% change in quantity demanded) / (% change in price)
Here, we have the demand function D(x) = 460 - x, where x is the price.
b) To find the elasticity at x = 103, we first need to calculate the quantity demanded, which is:
q = D(103) = 460 - 103 = 357
Now, we'll find the derivative of the demand function with respect to price:
dq/dx = -1
Next, we'll use the formula for PED:
PED = (dq/dx * x) / q = (-1 * 103) / 357 = -103/357 ≈ -0.289
Since the absolute value of PED is less than 1, demand is inelastic at x = 103.
c) To find the elasticity at x = 205, we'll follow the same steps:
q = D(205) = 460 - 205 = 255
PED = (dq/dx * x) / q = (-1 * 205) / 255 ≈ -0.804
Again, the absolute value of PED is less than 1, so demand is inelastic at x = 205.
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Х
translate one-step equations and solve
write an equation to represent the following statement.
15 is 9 more than j.
solve for j.
j%3d
co
stuck? review related articles/videos or use a hint.
To translate one-step equations, you need to understand the language of algebra.
Algebraic expressions involve variables, numbers, and operations such as addition, subtraction, multiplication, and division. One-step equations require only one operation to isolate the variable, making them easy to solve.
To write an equation to represent the statement "15 is 9 more than j," you can use the equation 15 = j + 9. This equation says that 15 is equal to j plus 9. To solve for j, you need to isolate j on one side of the equation by subtracting 9 from both sides. This gives you the equation j = 6.
To solve the equation j % 3 = c, you need to understand the modulus operator, which gives you the remainder when two numbers are divided. In this case, j % 3 means the remainder when j is divided by 3. To solve for j, you need to multiply both sides of the equation by 3, which gives you the equation j = 3c.
In summary, to translate one-step equations, you need to understand the language of algebra and the operations involved. To solve for variables, you need to isolate them on one side of the equation. And to solve equations involving the modulus operator, you need to understand how it works and how to apply it to solve for variables.
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A bookstore conducted a survey to see how many books their customers bought in a year. 100 customers were chosen at random. 30% of customers bought 3 books per year, 25% of customers bought 5 books per year, and 45% of customers bought 6 books per year. What was the average number of books bought per year?
Question 1 options:
4. 50
5. 75
4. 85
The average number of books bought per year by customers in the survey is approximately 4.85 books.
To find the average number of books bought per year, we need to calculate the mean of the data set. We can do this by using the formula:
Average = (Sum of all data points) / (Number of data points)
However, we do not have the actual number of data points. Instead, we have percentages. Therefore, we need to convert the percentages into actual numbers.
Out of 100 customers surveyed:
30% bought 3 books, which is equal to 30/100 x 100 = 30 customers
25% bought 5 books, which is equal to 25/100 x 100 = 25 customers
45% bought 6 books, which is equal to 45/100 x 100 = 45 customers
Now, we can calculate the average number of books bought per year using the formula mentioned earlier:
Average = (30 x 3) + (25 x 5) + (45 x 6) / (30 + 25 + 45)
Simplifying the above equation, we get:
Average = (90 + 125 + 270) / 100
Therefore, the average number of books bought per year is:
Average = 485/100
Average = 4.85 books per year (rounded to two decimal places)
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The equation y = –1.25x + 13.5
represents the gallons of water
y left in an inflatable pool after
x minutes. Select all the true
statements.
A. When the time starts, there
are 13.5 gallons of water in
the pool.
B. The tub is being filled at a rate
of 1.25 gallons per minute.
C. The water is draining at a rate
of 1.25 gallons per minute.
D. When the time starts, there
are 1.25 gallons of water in
the pool.
E. The water is draining at a rate
of 13.5 gallons per minute.
F. When the time starts, there
are 12.25 gallons of water in
the pool.
The two true statements are:
A "When the time starts, there are 13.5 gallons of water in the pool."
C "The water is draining at a rate of 1.25 gallons per minute."
Which statements are true?Here we have the linaer equation y = –1.25x + 13.5 that represents the gallons of water y left in an inflatable pool after x minutes.
And we want to see which of the given statements are true.
We can see that the slope is -1.25, this means that the volume of water is reducing (due to the negative sign) then the statement C is true.
We also can see that the y-intercept is 13.5, that would be the initial volume of water in the pool, then the statement A "When the time starts, there are 13.5 gallons of water in the pool." is also true.
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15. sheila has an eye-height of 5.4 feet and is standing 33 feet from a building. the angle of elevation from her line of
sight to the top of the building is 71 degree how tall is the building? round to the nearest tenth.
The height of the building is approximately 102.3 feet, rounded to the nearest tenth.
Step 1: Draw a right triangle with Sheila's eye-height as the base, the building's height as the vertical side, and the distance between Sheila and the building as the horizontal side.
Step 2: We are given the angle of elevation (71 degrees) and the horizontal distance (33 feet). To find the vertical distance, we can use the tangent function in trigonometry. The formula is:
tan(angle) = (opposite side) / (adjacent side)
Step 3: Plug in the given values into the formula:
tan(71) = (vertical distance) / 33
Step 4: Solve for the vertical distance:
vertical distance = 33 * tan(71) ≈ 96.9 feet
Step 5: Add Sheila's eye-height to the vertical distance to find the total height of the building:
total height = eye-height + vertical distance
total height = 5.4 + 96.9 ≈ 102.3 feet
The height of the building is approximately 102.3 feet, rounded to the nearest tenth.
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Helpppppppppppppppppppppp
Aside from beautiful places, Tagaytay is also known for its
pasalubong items. Rowena's offers different tarts: (Buko, Ube, Pineapple, Yema
and Mango). A box of tart contains 9 pieces and you are allowed to have a
maximum of three different flavors per box, how many different combinations
are there?
a. There is only one flavor Solution:
How many fiavors are there?
b. There are two flavors Solution:
How many different flavors can you pair with Buko?
How many different flavors can you pair with Ube?
How many combinations of two flavors are there?
c. There are three flavors Solution:
How many different flavors can you pair with Ube?
How many different flavors can you pair with Pineapple and Ube?
How many different flavors can you pair with Ube and Mango?
How many combinations of three different flavors are there?
There are 5 combinations with one flavor, 10 combinations with two flavors, and 10 combinations with three flavors, resulting in 25 possible combinations in total.
a. Only one flavor is there.
b. Buko can be paired with 4 other flavors and Ube can be paired with 3 remaining flavors.
c. 10 combinations of three flavors.
a. There is only one flavor: Since the box contains only one flavor, there are 5 possible combinations (Buko, Ube, Pineapple, Yema, and Mango).
b. There are two flavors:
- Buko can be paired with 4 other flavors (Ube, Pineapple, Yema, Mango).
- Ube can be paired with 3 remaining flavors (Pineapple, Yema, Mango).
- Pineapple can be paired with 2 remaining flavors (Yema, Mango).
- Yema can be paired with 1 remaining flavor (Mango).
In total, there are 10 combinations of two flavors.
c. There are three flavors:
- There are 5 flavors in total, and we want to choose 3. We can use the formula for combinations: C(n, k) = n! / (k!(n-k)!), where n is the total number of flavors and k is the number of flavors to choose.
- C(5, 3) = 5! / (3!(5-3)!) = 10 combinations of three flavors.
So, there are 5 combinations with one flavor, 10 combinations with two flavors, and 10 combinations with three flavors, resulting in 25 possible combinations in total.
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You make street signs. This morning, you need to make a triangular sign and a circular sign. The material used to make the signs costs $17. 64 per square foot. Based on the designs, the base of the triangular street sign is 3 feet, and the height is 2. 6 feet. The circular street sign has a radius of 1. 5 feet. What is the total cost to make the two signs?
Answer: $193.42
Step-by-step explanation:
Based on the given designs, the cost to make the triangular and circular street signs would be $68.60 and $124.42 respectively, making the total cost of making both signs $193.02.
To calculate the cost of making the two street signs, we need to first find the area of each sign. The area of a triangle is given by the formula 1/2 x base x height. So, for the triangular street sign, the area would be 1/2 x 3 x 2.6 = 3.9 square feet.
The area of a circle is given by the formula π x radius². So, for the circular street sign, the area would be π x (1.5)² = 7.065 square feet.
Now that we have the areas of both signs, we can calculate the total cost of the material needed. The cost per square foot of material is $17.64, so we need to multiply this by the total area of the signs.
For the triangular sign, the cost would be 3.9 x $17.64 = $68.60.
For the circular sign, the cost would be 7.065 x $17.64 = $124.42.
Therefore, the total cost to make both signs would be $68.60 + $124.42 = $193.02.
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The sequence U is defined by: Un +2 = 2 * Un+1+1* Un for n > 2 with given up and u uo 3 U = 1 List the first four terms uo, 21, U2, U3. Enter your answer as: value of uo, value of u1, value of uz, value of uz Enter answer here
The given values for uo and u3 are uo = 1 and u3 = 21. We can use the recurrence relation Un+2 = 2 * Un+1+1* Un to find the remaining terms:
U1 = U3 - 2U2 - 1*U0
U1 = 21 - 2U2 - 1*1
U1 = 20 - 2U2
U2 = U1 - 2U0 + 1*U0
U2 = 20 - 2U0 + 1*1
U2 = 19 - 2U0
Therefore, the first four terms are: 1, 19, -17, -53
So, the answer is: 1, 19, -17, -53.
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Linus received 12 marks more in Test 2 than his score in Test 1. This was a 15%
improvement. He then made another 4-mark improvement in Test 3.
(a) What was his score for Test 1?
(b) What was the percentage increase in his test score from Test 2 to Test 3?
Give your answer correct to 1 decimal place.
(a) Linus's score for Test 1 is 80. (b) The percentage increase in his test score from Test 2 to Test 3 is 4.3%.
(a) Let's denote Linus's score in Test 1 as "x." Since he received 12 more marks in Test 2, his score for Test 2 is "x + 12." The 15% improvement means that (x + 12) is 115% of x:
x + 12 = 1.15x
Now, we can solve for x:
12 = 0.15x
x = 12 / 0.15
x = 80
So, Linus's score in Test 1 was 80.
(b) Linus made a 4-mark improvement in Test 3, so his score was (x + 12) + 4, which is (80 + 12) + 4 = 96. To find the percentage increase from Test 2 to Test 3, we can use the formula:
Percentage increase = ((New score - Old score) / Old score) * 100
Percentage increase = ((96 - 92) / 92) * 100
Percentage increase = (4 / 92) * 100
Percentage increase ≈ 4.35
The percentage increase in his test score from Test 2 to Test 3 is approximately 4.3% (correct to 1 decimal place).
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Which set of ordered pairs represents a proportional relationship? A. {(4, 1), (0, 0), (6, 2), (8, 4)} B. {(2, 1), (4, 3), (8, 9), (16, 27)} C. {(2, 3), (6, 9), (10, 15), (22, 33)} D. {(4, 9), (7, 12), (10, 15), (18, 23)}
Answer:
C.
Step-by-step explanation:
3 = 1.5 * 2
9 = 1.5 * 6
15 = 1.5 * 10
33 = 1.5 * 22
Dado un triángulo equilatero de lado 4cm, calcula su altura. encuentra su área
The height of the triangle is given as follows:
[tex]h = 2\sqrt{3}[/tex] cm.
The area of the triangle is given as follows:
[tex]A = 4\sqrt{3}[/tex] cm².
What is the Pythagorean Theorem?The Pythagorean Theorem states that in a right-angled triangle, the square of the length of the hypotenuse (the longest side) is equal to the sum of the squares of the lengths of the other two sides.
The theorem is expressed as follows:
c² = a² + b².
In which:
c is the length of the hypotenuse.a and b are the lengths of the other two sides (the legs) of the right-angled triangle.Considering an equilateral triangle, in which all the side lengths are of 4, we have a right triangle in which:
The sides are 2 cm and the height h.The hypotenuse is of 4 cm.Hence the height is obtained as follows:
h² + 2² = 4²
h² = 12
[tex]h = \sqrt{3 \times 4}[/tex]
[tex]h = 2\sqrt{3}[/tex] cm
The area of a triangle is given as half the multiplication of the base and of the height, hence:
[tex]A = 0.5 \times 4 \times 2 \sqrt{3}[/tex]
[tex]A = 4\sqrt{3}[/tex] cm².
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Mathswatch Question:
Liam is a tyre fitter.
It takes him 124 minutes to fit 4 tyres to a lorry.
a) How long would it take him to fit 6 tyres to a lorry. ?
b) If he works for 93 minutes, how many tyres can he fit?
Working out for question a:
a) 124×6÷4=186(minutes)
Correct answer for question a is 186.
Correct answer for question b is 3
To answer question a, we use the formula:
time taken = (number of tyres to fit x time taken to fit one tyre) / number of tyres fitted at once
In this case, Liam takes 124 minutes to fit 4 tyres to a lorry. To find out how long it would take him to fit 6 tyres, we plug in the values:
time taken = (6 x 124) / 4
time taken = 186 minutes
So it would take Liam 186 minutes to fit 6 tyres to a lorry.
For question b, we know that Liam takes 124 minutes to fit 4 tyres, so he takes 31 minutes to fit 1 tyre. If he works for 93 minutes, we can find out how many tyres he can fit:
number of tyres = time taken / time taken to fit one tyre
number of tyres = 93 / 31
number of tyres = 3
So Liam can fit 3 tyres in 93 minutes.
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pls help me out on both questions !!!!
The mass of iron III sulfate is 300 g.
What is the stoichiometry?If 1 mole of iron III sulfate is produced when 3 moles of hydrogen is produced
x moles of iron III sulfate is produced when 2.25 moles of hydrogen is produced
x = 1 * 2.25/3
= 0.75 moles
Mass of the iron III sulfate = 0.75 moles * 400 g/mol
= 300 g
Number of moles of iron = 85 g/56 g/mol
= 1.5 moles
If 2 moles of iron produces 1 mole of iron III sulfate
1.5 moles of iron produces 1.5 * 1/2
= 0.75 moles
Mass of the iron III sulfate = 0.75 moles * 400 g/mol
= 300 g
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Please help!!!
4. Graph the quadratic y=x²-2x-5 below
The vertex of the function is -6.
The domain of the function is {real numbers}.
The range of the function is y ≥ -6.
What are the domain and range of the function?The range and domain of the function is calculated as follows;
y = x² - 2x - 5
From the graph of the function, the range of the function includes y values;
range = y ≥ -6
From the graph of the function, the domain of the function includes x values;
domain = real numbers.
The vertex of the graph is -6.
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A dealer made lost of 10% by selling an article for 81,000 naira. How much should he have sold it to make a profit of 15%
The dealer should have sold the article for 103,500 naira to make a profit of 15%.
Let C be the cost price of the composition. According to the problem, the dealer vended the composition at a loss of 10, so he entered 90 of the cost price. thus, 90 of C is equal to 81,000 naira.
C = 81,000
C = 81,000/0.9
C = 90,000
So, the cost price of the composition is 90,000 naira.
Now, let's find out the selling price needed to make a profit of 15 Let S be the needed selling price to make a profit of 15. We know that profit chance is equal to( profit/ cost price) × 100.
Thus,(15/100) × 90,000 =
S- 90,000 , 500
= S- 90,000
S = 90,000 13,500
S = 103,500
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a mobile food vendor sells hot apple cider and ice cream at special events throughout the year. the function f(x)=500x2+10,000f(x)=500x2+10,000can be used to model the food vendor's annual revenue xx years from now.when should the food vendor expect to bring in $ 60,00060,000 in annual revenue?−3x-3x−5x-5x−2x-2x
The function f(x)=500[tex]x^2[/tex] +10,000 can be used to model the food vendor's annual revenue. The food vendor would expect to bring in $ 60,000 in annual revenue by 10 years from now.
To find out when the mobile food vendor should expect to bring in $60,000 in annual revenue using the function f(x) = 500x^2 + 10,000, follow these steps:
1. Set the function equal to 60,000: 500[tex]x^2[/tex]+ 10,000 = 60,000
2. Subtract 60,000 from both sides of the equation: 500[tex]x^2[/tex]+ 10,000 - 60,000 = 0
3. Simplify the equation: 500[tex]x^2[/tex]- 50,000 = 0
4. Divide both sides by 500:[tex]x^2[/tex] - 100 = 0
5. Add 100 to both sides: [tex]x^2[/tex] = 100
6. Find the square root of both sides: x = ±10
Since it doesn't make sense to have a negative number of years, the food vendor should expect to bring in $60,000 in annual revenue 10 years from now.
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A number cube is rolled twice. what is the probability of getting a six on the first role, then a number less than 5 on the second roll?
If a number cube is rolled twice, then the probability of getting a six on the first role and then a number less than 5 on the second role is 1/9.
To find the probability of getting a six on the first roll and a number less than 5 on the second roll, we will multiply the individual probabilities of each event.
A number cube has 6 faces, so the probability of rolling a six is 1/6.
For the second roll, there are 4 numbers less than 5 (1, 2, 3, and 4), so the probability of rolling a number less than 5 is 4/6 or 2/3.
To find the combined probability, simply multiply the two probabilities: (1/6) × (2/3) = 2/18 = 1/9.
So, the probability of getting a six on the first roll and a number less than 5 on the second roll is 1/9.
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GARDENING A gardener is selecting plants for a special display. There are 15 varieties of pansies from which to choose. The gardener can only use 9 varieties in the display. How many ways can 9 varieties be chosen from the 15 varieties?
Answer:
5,005
Step-by-step explanation:
This is a combination problem. The formula for combination is:
nCr = n! / (r!(n-r)!)
Where n is the total number of items, and r is the number of items to be selected.
Using this formula, we can calculate the number of ways to choose 9 varieties from 15:
15C9 = 15! / (9!(15-9)!) = 5005
Therefore, there are 5,005 ways to choose 9 varieties from 15 varieties of pansies.
How much would it cost to buy a cover for the pool that cost $0.30 per square foot
It would cost $735 to buy a cover for the pool at $0.30 per square foot
How much would it cost to buy a cover for the poolFrom the complete question (see attachment), we have the following parameters that can be used in our computation:
Unit rate = $0.30 per square foot
Dimensions = 10 inches by 20 inches
Scale = 2 inches : 7 feet
Using the above as a guide, we have the following:
Total cost = Unit rate * Area of pool
Where
Area of the pool = 10 inches * 20 inches
Using the scale, we have
Area of the pool = (10 * 7/2)* (20 * 7/2) square feet
Area of the pool = 2450 square feet
Substitute the known values in the above equation, so, we have the following representation
Total cost = $0.30 per square feet * 2450 square feet
This gives
Total cost = $735
Hence, it would cost $735 to buy a cover for the pool
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Complete question
The blueprint of a pool has a scale of 2 inches equals 7 feet. The scale drawing is shown below (see attachment)
How much would it cost to buy a cover for the pool that cost $0.30 per square foot
Exl) Solve exercise 3 on the first page of the handout; that is, find y" if 2.23 – 3y = 8. Then, answer the following question. What equation did you obtain after differentiating both sides of the given equation with respect to x? ENTER dy/dx or y'where needed, enter a power using the symbol^, for example enter was x^3, NO SPACES: fill in blank
To solve exercise 3 on the first page of the handout, we need to first isolate y in the given equation 2.23 - 3y = 8, which gives us y = -1.59.
To find y", we need to differentiate both sides of the equation with respect to x twice. The first derivative gives us:
-3(dy/dx) = 0
Simplifying, we get dy/dx = 0.
Differentiating again, we get:
-3d^2y/dx^2) = 0
Simplifying, we get d^2y/dx^2 = 0.
Therefore, the equation we obtain after differentiating both sides of the given equation with respect to x is d^2y/dx^2 = 0, which is the second derivative of y with respect to x.
To solve the equation given on the first page of the handout, 2.23 - 3y = 8, first isolate y:
1. Subtract 2.23 from both sides: -3y = 5.77
2. Divide both sides by -3: y = -5.77/3
Your answer: y = -5.77/3
The original equation doesn't have any x terms, so differentiation with respect to x is not applicable in this case.
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2. 6. 4 practice algebra 2 you are helping to design a road for a high mountain pass. There are two routes over the pass, but both have to cross step ravines. Use what you know about solving radical functions to design a bridge that will safely cross the ravine
Answer:
Step-by-step explanation:
I can provide you with general information about radical functions and their graphs, but I cannot design a bridge for you.
In order to design a bridge that will safely cross the ravine, you would need to take into account a wide range of factors, including the length and width of the ravine, the types of materials that can be used to construct the bridge, the weight and size of the vehicles that will be crossing the bridge, and the weather and environmental conditions in the area. This would likely require the expertise of a civil engineer or other trained professional.
Regarding radical functions, they are functions that involve a radical symbol (such as a square root) in their equation. The graph of a radical function is typically a curve that starts at the point (0,0) and moves upwards and to the right. The shape of the curve will depend on the specific radical function and the values of its parameters.
To solve a radical function, you would typically isolate the radical term on one side of the equation and then square both sides of the equation to eliminate the radical. However, it is important to be careful when squaring both sides, as this can introduce extraneous solutions that do not satisfy the original equation.
Christy went jogging on saturday. the table shows how far she had jogged after various times.
distance (miles) 10
15
20
time (hours)
2
3
4.
christy subtracted to find her jogging rate for each time period and said that her rate
increased each hour, from 8 to 12 to 16 miles per hour. is christy correct? explain why or
why not.
She is incorrect when she said that her rate increased each hour from 8 to 12 to 16 miles per hour. Her jogging rate was actually a steady 5 miles per hour.
You asked if Christy is correct when she said that her rate increased each hour, from 8 to 12 to 16 miles per hour. Let's analyze the data given in the table and see if she's right.
The table shows the distance Christy jogged and the corresponding time:
- 10 miles in 2 hours
- 15 miles in 3 hours
- 20 miles in 4 hours
To find her jogging rate for each time period, we need to divide the distance by the time.
1. For the first 2 hours:
Jogging rate = distance / time = 10 miles / 2 hours = 5 miles per hour
2. For the first 3 hours:
Jogging rate = distance / time = 15 miles / 3 hours = 5 miles per hour
3. For the first 4 hours:
Jogging rate = distance / time = 20 miles / 4 hours = 5 miles per hour
Christy's jogging rate remained constant at 5 miles per hour throughout her run. Therefore, she is incorrect when she said that her rate increased each hour from 8 to 12 to 16 miles per hour. Her jogging rate was actually a steady 5 miles per hour.
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Find the radius of gyration of a plate covering the region
bounded by y=x2, x=6, and the x-axis with
respect to the x-axis
(Type exact answer)
The radius of gyration of the plate about the x-axis is [tex]6 \sqrt{6} / 5[/tex] units.
How to find the radius of gyration of a plate covering the region?To find the radius of gyration of a plate covering the region bounded by [tex]y = x^2[/tex], x = 6, and the x-axis with respect to the x-axis, we need to use the formula:
[tex]k_x = \sqrt{(I_x / A)}[/tex]
where [tex]k_x[/tex] is the radius of gyration, [tex]I_x[/tex] is the moment of inertia of the plate about the x-axis, and A is the area of the plate.
We can calculate the area A of the plate as follows:
[tex]A = \int\limits^6_0 { x^2}\, dx\\= [x^3/3]\ from\ 0\ to\ 6\\= 72[/tex]
To find the moment of inertia [tex]I_x[/tex], we can use the formula:
[tex]I_x = \int\ {y^2} \, dA[/tex]
where y is the perpendicular distance of an element of area [tex]dA[/tex] from the x-axis. We can express y in terms of x as y = x². Therefore, we have:
[tex]dA = y dx = x^2 dx\\I_x = \int\limits^6_0 { x^2 (x^2)} dx\\= \int\limits^6_0 {x^4}\, dx\\= [x^5/5]\ from\ 0\ to\ 6\\= 6^5/5[/tex]
Substituting these values into the formula for [tex]k_x[/tex], we get:
[tex]k_x = \sqrt{(I_x / A)}\\= \sqrt{((6^5/5) / 72)}\\= \sqrt{(6^3 / 5)}\\= 6 \sqrt{6} / 5[/tex]
Therefore, the radius of gyration of the plate about the x-axis is [tex]6 \sqrt{6}/ 5[/tex] units.
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Choose the equations that are equivalent. Select all that apply. A. 52 = 8n + 4 B. 4(2n + 1) = 52 C. 4 = 52 – 8n D. 4n = 48
A. 52 = 8n + 4, B. 4(2n + 1) = 52 and C. 4 = 52 – 8n are the equivalent equations.
Choosing the equations that are equivalentSimplifying the equations, we have
A. 52 = 8n + 4
8n = 48
n = 6
To see this, first simplify equation B:
4(2n + 1) = 52
8n + 4 = 52
8n = 48
n = 6
C. 4 = 52 – 8n
8n = 48
n = 6
Then simplify equation D:
4n = 48
n = 12
As you can see, equations A, B and C are equivalent and both simplify to n = 6.
Therefore, the correct answers are A, B and C.
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Rita and Jan are working on a school project together. Rita has completed 0.3 of her portion, and Jan has completed a portion as well. Use the model to complete the equation below and find how much of the total project Rita and Jan have completed.
answer the question.
Answer:
rita and john are susseful the job
js school
Dr. Aghedo is saving money in an account with continuously compounded interest. How long will it take for the money she deposited to double if interest is compounded continuously at a rate of 3. 1%. Round your answer to the nearest tenth
The count of duration that is needed for Dr. Aghedo's money to be deposited is 22.3 years, under the condition that if interest is compounded continuously at a rate of 3. 1
The derived formula for doubling time with continuous compounding is applied to evaluate the length of time it takes to double the money in an account or investment that has continuous compounding. The formula is
Doubling time = ln 2 / r
Here,
r =annual interest rate as a decimal.
For the required case, the interest rate is 3.1% that can be written as 0.031 in the form of decimal. Then the doubling time will be
Doubling time = ln 2 / 0.031
≈ 22.3 years
Then, it should take approximately 22.3 years for Dr. Aghedo's money to double if interest is compounded continuously at a rate of 3.1%.
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please help!
Given YZ tangent to ⊙J at point Y and m∠WYZ = 104, what is mWXY?
The measure of the angle WXY is 152 degrees
Calculating the measure of the angle WXY?From the question, we have the following parameters that can be used in our computation:
Line segment YZ tangent to J at point Y The measure of m∠WYZ = 104,Using the above as a guide, we have the following:
m∠MYW = 104 - 90
m∠MYW = 14
The inscribed angle opposite to the same arc is half of the external angle
So, we have
mw = 2 * m∠MYW
mw = 2 * 14
mw = 28 degrees
Also, we have
my = 180 degrees
So, we have
Angle WXY = 180 - 28
Evaluate the difference
Angle WXY = 152
Hence, the measure of the angle is 152 degrees
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someone help plss my state test is soon
The graph of constant of proportionality of y = 3.75x is attached
What is constant of proportionality?The constant of proportionality is a term that indicates a reciprocal relationship between two variables, in which the change of one affects the other similarly.
When x and y are directly linked in this way, the following equation can be used to calculate how they operate together:
y = kx,
where
k serves as the aforementioned constant.
In the problem k = 3.75
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