The solutions to the equation [tex]15z^2 +6z -8 =4z[/tex] are z = 2/3 or z = -4/5.
To solve the quadratic equation [tex]15z^2 +6z -8 =4z[/tex], we first need to rearrange it into standard form:
[tex]15z^2 + 2z - 8 = 0[/tex]
Now we can apply the quadratic formula:
z = (-b ± √(b² - 4ac)) / 2a
where a = 15, b = 2, and c = -8.
Plugging in these values, we get:
z = (-2 ± √(2² - 4(15)(-8))) / (2(15))
z = (-2 ± √(4 + 480)) / 30
z = (-2 ± √484) / 30
z = (-2 ± 22) / 30
So z equals either (-2 + 22)/30 = 2/3 or (-2 - 22)/30 = -4/5.
Therefore, the solutions to the equation 15z² +6z -8 =4z are z = 2/3 or z = -4/5.
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a fair die is rolled. if a number 1 or 2 appears, you will receive $5. if any other number appears, you will pay $2. what is the mean value of one trial of this game?
The mean value of one trial of the given game is -$0.1667 (or -$0.17 rounded to the nearest cent).
Given, when a fair die is rolled, If a number 1 or 2 appears, you will receive $5. If any other number appears, you will pay $2.
To find the mean value of one trial of this game, we have to multiply the probability of each outcome by its associated value and sum the products together, which is expressed in the formula:
E(X) = p1 x v1 + p2 x v2 + ... + pn x vn
Where, E(X) is the expected value (or mean value) of the gamep1, p2, ..., pn are the probabilities of each outcome
v1, v2, ..., vn are the values associated with each outcome
Let the event of rolling a number 1 or 2 be called A and the event of rolling any other number be called B.p(A) = 2/6 = 1/3p(B) = 4/6 = 2/3v(A) = $5v(B) = -$2E(X) = p(A) x v(A) + p(B) x v(B) = (1/3) x 5 + (2/3) x (-2) = -0.1667
Therefore, the mean value is -$0.1667 (or -$0.17 rounded to the nearest cent).
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I NEED HELP ON THIS ASAP!!
A sports ticketing company offers two ticket
plans. One plan costs $110 plus $25 per ticket.
The other plan costs $40 per ticket. How many
tickets must Gloria buy in order for the first plan
to be the better buy?
For the above question by using inequalities she must buy atleast 8 tickets.
What are inequalities?
Equal does not imply inequality. Typically, we use the "not equal sign ()" to indicate that two values are not equal.
So according to question
One plan costs =$110
Extra of $25 per ticket
let the tickets be x, so the quation will be
=> 110 + 25x ≤ 40x
=> 110 ≤ 15x
=>7 1/3 ≤ x
So, if she must at least buy 8 tickets, the first plan saves money.
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50 Points
Janey paints a block of wood with gold glitter for an art project. The block measures
8 inches by 10 inches by 20 inches.
After she's done, she decides to make two blocks by cutting through the block on the
red line. She still wants each block to be covered with gold glitter.
What is the total area of the cut surfaces she still needs to paint?
Answer the questions to find out.
1. What is the shape of each cut surface? what are its dimensions?
2. What is the area of each cut surface?
3. What is the total area Jenny needs to paint? Explain how you found your answer.
Answer:
The shape of each cut surface is a rectangle. The dimensions of each cut surface are 8 inches by 10 inches.
The area of each cut surface is 8 inches x 10 inches = 80 square inches.
Since there are two cut surfaces, the total area that Jenny needs to paint is 2 x 80 square inches = 160 square inches.
Answer: Each cut surface is a rectangle with dimensions of 8 inches by 10 inches.
The area of each cut surface is:
A = l * w
A = 8 in * 10 in
A = 80 sq in
So each cut surface has an area of 80 square inches.
To find the total area Jenny needs to paint, we need to find the combined area of both cut surfaces. Since there are two cut surfaces, we simply need to multiply the area of one cut surface by 2:
Total area = 2 * area of one cut surface
Total area = 2 * 80 sq in
Total area = 160 sq in
Therefore, Jenny needs to paint a total area of 160 square inches.
Step-by-step explanation:
a store clerk wants to stack shoe boxes on a shelf that is 3 ft tall. a shoebox has a volume that is 528 cubic inches and the area of the base is 96 square inches. find the height of each shoe box and determine how mnay shoe boxes the clerk can stack on the shelf
The height of each shoebox is 5.5 inches and the clerk can stack 7 shoe boxes (6 full and 1 partially filled) on the shelf.
A store clerk wants to stack shoe boxes on a shelf that is 3 ft tall.
A shoebox has a volume that is 528 cubic inches and the area of the base is 96 square inches.
Find the height of each shoebox and determine how many shoe boxes the clerk can stack on the shelf.
The volume of each shoebox.
To find the height of each shoebox, we have to know its volume and base area.
Let h be the height of the shoebox.
Volume of the shoebox is V = 528 cubic inches.
And area of the base is A = 96 square inches.
Therefore, Volume of the shoebox,
V = Ah ⇒ 528 = 96h ⇒ h = 528/96 ⇒ h = 5.5 inches.
Hence, the height of each shoebox is 5.5 inches.
We need to find how many shoe boxes the clerk can stack on the shelf.
The height of the shelf is 3 ft = 36 inches.
If the height of each shoe box is 5.5 inches, then the number of shoe boxes that the clerk can stack on the shelf can be found by dividing the total height of the shelf by the height of each box.
Therefore, the number of shoeboxes the clerk can stack on the shelf is:
No. of shoeboxes = Height of the shelf / Height of each shoebox
⇒ No. of shoeboxes = 36/5.5 = 6.54.
So, the clerk can stack 6 full shoe boxes and the 7th box can be filled partially (5.5 inches of height).
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Do the Cauchy-Schwarz Inequality and the triangle inequality hold for the given vectors and inner product?u = (5, 3), v = (14, 4), (u, v) = u · v(a) the Cauchy-Schwarz Inequality Yes / No(b) the triangle inequality Yes / No
a) Yes, the Cauchy-Schwarz Inequality holds for the given vectors and inner product. Since 74 ≤ 76.84, the Cauchy-Schwarz Inequality holds.
b) Yes, the triangle inequality holds for the given vectors and inner product. Since 20.25 ≤ 23.21, the triangle inequality holds.
How do we know the Cauchy-Schwarz Inequality and the triangle inequality hold given vectors and inner product?Cauchy-Schwarz Inequality:
Using the given inner product, we have:
|u · v| ≤ ||u|| ||v||where ||u|| and ||v|| denote the norms of the vectors u and v, respectively.
We can calculate:
||u|| = sqrt(5^2 + 3^2) = sqrt(34)||v|| = sqrt(14^2 + 4^2) = sqrt(212)Then, applying the Cauchy-Schwarz Inequality, we have:
|u · v| = |(5)(14) + (3)(4)| = 74||u|| ||v|| = sqrt(34) sqrt(212) ≈ 76.84Triangle Inequality:
The triangle inequality states that for any vectors u, v, and w, we have:
||u + v|| ≤ ||u|| + ||v||Using the given vectors, we can calculate:
||u + v|| = ||(5 + 14, 3 + 4)|| = ||(19, 7)|| = sqrt(19^2 + 7^2) ≈ 20.25||u|| + ||v|| = sqrt(5^2 + 3^2) + sqrt(14^2 + 4^2) ≈ 23.21Learn more about Triangle Inequality
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Olivia bought snacks for her team's practice. She bought a bag of apples for $3.19 and a 24-pack of juice bottles. The total cost before tax was $55.51. Which tape diagram could be used to represent the context if
�
x represents how much each bottle of juice costs?
The expression 24x = 55.51 - 3.19 the given condition and the number of bottle is 2.18 or 2 option D is correct
Given that,
She bought a bag of apple for $3.19 and a 24-pack of juice bottles. The total cost before tax was $55.51.
To determine the diagram could be used to represent the context if x represents how much each bottle of juice costs.
What is arithmetic?
In mathematics, it deals with numbers of operations according to the statements. There are four major arithmetic operators, addition, subtraction, multiplication, and division,
Here,
Let the cost of each juice bottle be x.
Now,
According to the question,
the expression will be
24x = 55.51 - 3.19
x= 2.18
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The ____ or sender component of a network generates the data to be sent and uses a ____ component, which converts the data into signals that can be carried by a ___ medium.
In summary, the transmitter component of a network is responsible for generating the data to be sent, which is then modulated into a signal that is sent over the transmission medium. The receiver component of the network then demodulates the signal back into the original data. The transmission medium is important as it determines the type of signal that can be sent, and the type of data that can be transmitted.
The transmitter or sender component of a network generates the data to be sent and uses a modulator component, which converts the data into signals that can be carried by a transmission medium. This process allows data to be transmitted over long distances, such as from a computer to another computer.
The transmitter generates the data to be sent, which can be anything from text and files to audio and video. The modulator converts the data into a signal that can be sent over a transmission medium, such as fiber optic cables, coaxial cables, or satellite communication systems. This signal is then transmitted over the medium, where it is received by the receiver component, which then demodulates the signal back into the original data.
The transmission medium is important, as it determines the type of signal that can be sent. Fiber optic cables are capable of sending high-speed signals over long distances, while coaxial cables are ideal for shorter distances. Satellite communication systems are best for sending signals over large distances.
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solve the inequality -8x < 32 should it be reveresed
The value of x for the given inequality to justify the equation to get the desired result of the equation is x < - 4 .
Define inequality:
In mathematics, inequality refers to a statement that compares two values or expressions, indicating that one value or expression is greater than or less than the other. An inequality can be represented using symbols such as "<" (less than), ">" (greater than), "<=" (less than or equal to), ">=" (greater than or equal to), or "≠" (not equal to). For example, "2x + 3 > 5" is an inequality that states that the expression "2x + 3" is greater than "5". Inequalities are often used in algebra, calculus, and other branches of mathematics to represent relationships between variables or to solve equations.
What about equation in the relation?
In mathematics, an equation is a statement that asserts the equality of two expressions. An equation consists of two expressions, separated by an equals sign "=" and it states that the value of one expression is equal to the value of the other expression. The expressions in an equation can contain variables, constants, and mathematical operations such as addition, subtraction, multiplication, and division. Equations are used in many areas of mathematics to describe relationships between variables, to solve problems, and to make predictions. For example, the equation "x + 3 = 7" states that the value of the expression "x + 3" is equal to "7".
According to the given information:
For the following equation we have that,
⇒ - 8x < 32
⇒ -x < [tex]\frac{32}{8}[/tex]
⇒ -x < [tex]4[/tex]
⇒ x < [tex]- 4[/tex]
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Prove the following question
We have shown that sin3A.cos2A - cos3A.sin2A / cos3A.cos2A + sin3A.sin2A = tanA is true for all values of A where the trigonometric functions are defined.
What is trigonometry?
The area of mathematics concerned with how triangles' sides and angles relate to one another as well as with the pertinent uses of any angle.
We can start by using trigonometric identities to simplify the left-hand side of the equation:
sin3A.cos2A - cos3A.sin2A = sin(3A + 2A) - sin(3A - 2A)
(using sum and difference formulae)
= 2 sin5A cosA
cos3A.sin2A = cos(3A - 2A) - cos(3A + 2A)
= -2 sinA cos5A
Substituting these into the original equation, we get:
(2 sin5A cosA) / (cos3A cos2A + sin3A sin2A) - (-2 sinA cos5A) / (cos3A cos2A + sin3A sin2A)
Simplifying further:
2 sin5A cosA + 2 sinA cos5A / (cos3A cos2A + sin3A sin2A)
We can use the identity tanA = sinA / cosA to write this as:
2 sinA cosA (sin4A + cos4A) / (cos3A cos2A + sin3A sin2A)
Using the identity sin2A + cos2A = 1 and rearranging, we get:
2 tanA (1 - sin2A cosA) / (cos2A + sin2A cosA)
= 2 tanA cosA / (cos2A + sin2A cosA)
= 2 sinA / (1 + cosA)
= (2 sinA / (1 + cosA)) * ((1 - cosA) / (1 - cosA))
= 2 sinA (1 - cosA) / (1 - cos^2A)
= 2 sinA (1 - cosA) / sin^2A
= 2 (1 - cosA) / sinA
= 2 sinA / sinA
= 2
Therefore, we have shown that sin3A.cos2A - cos3A.sin2A / cos3A.cos2A + sin3A.sin2A = tanA is true for all values of A where the trigonometric functions are defined.
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The sum of two numbers is 18. Their difference is -8. Find the two numbers.
Part A
Write a system of equations that represents the situation.
x + y =
x-y =
Part B
Solve the system of equations. Express the coordinates as decimals if necessary.
Answer:
Step-by-step explanation: is 13 bc 13-8 is 5 and 5+1313is
Lauren leans a 16-foot ladder against a wall so that it forms an angle of 78 ∘ ∘ with the ground. how high up the wall does the ladder reach? round your answer to the nearest hundredth of a foot if necessary.
The ladder reaches the height of approximately 16.03 feet up the wall. (Rounded to the nearest hundredth of a foot)
We can use trigonometry to solve this problem. Let h be the height up the wall that the ladder reaches, and let θ be the angle that the ladder makes with the ground. We know that the length of the ladder (hypotenuse) is 16 feet and the angle θ is 78 degrees.
We can use the trigonometric function tangent (tan) to find the height h:
tan(θ) = opposite/adjacent
In this case, the opposite side is the height h, the adjacent side is the distance from the ladder to the wall (which is the same as the distance from the wall to Lauren), and the angle θ is 78 degrees. So we have:
tan(78°) = h/x
where x is the distance from the ladder to the wall. Solving for h, we get:
h = x * tan(78°)
We don't know the value of x, but we can use the fact that the ladder is 16 feet long to find it. Using the Pythagorean theorem, we have:
x^2 + h^2 = 16^2
Substituting h = x * tan(78°), we get:
x^2 + (x * tan(78°))^2 = 16^2
Simplifying, we get:
x = 16 / √(1 + tan^2(78°))
x ≈ 3.83 feet
Finally, we can substitute x into our equation for h:
h = x * tan(78°)
h ≈ 16.03 feet
Therefore, the ladder reaches approximately 16.03 feet up the wall. Rounded to the nearest hundredth of a foot, the answer is 16.03 feet.
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F=9/5C+32 ¿cual seria su inversa? ¿que temperatura en C corresponde a 100 F? ¿ Que temperatura en F corresponde a 30 C?
1. Inverse of F=9/5C+32 is C=5/9(F-32)
2. 100 F = 37.8 C
3. 30 C = 86 F
To find the inverse of
F = 9/5C+32,
we need to solve for C. First, subtract 32 from both sides of the equation to get
F-32 = 9/5C.
Then, multiply both sides by 5/9 to isolate C, giving us
C = 5/9(F-32).
This is the inverse function.
To find the temperature in Celsius that corresponds to 100 degrees Fahrenheit, we can use the inverse function. Substituting F=100 into
C = 5/9(F-32), we get
C = 5/9(100-32) = 37.8 degrees Celsius.
To find the temperature in Fahrenheit that corresponds to 30 degrees Celsius, we can use the original equation. Substituting C=30 into
F=9/5C+32,
we get
F = 9/5(30)+32 = 86 degrees Fahrenheit.
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Complete Question:
F=9/5C+32, what would be its inverse? What temperature in C corresponds to 100 F? What temperature in F corresponds to 30 C?
suppose $n$ (infinitely long) straight lines lie on a plane in such a way that no two of the lines are parallel, and no three of the lines intersect at a single point. show that this arrangement divides the plane into $\frac{n^2 n 2}{2}$ regions.
To show that $n$ infinitely long straight lines, arranged on a plane in such a way that no two lines are parallel and no three lines intersect at a single point, divide the plane into $\frac{n^2 + n}{2}$ regions, follow these steps:
Solution:
1. Start with one straight line on the plane. This line divides the plane into two regions.
2. Add a second straight line that is not parallel to the first line and doesn't intersect at the same point. This second line will divide each of the two existing regions in half, creating two additional regions, for a total of four regions.
3. Now, add a third straight line that is not parallel to any of the existing lines and doesn't intersect at the same point as any other two lines. This line will intersect the two previous lines and divide each of the four existing regions in half, creating three additional regions for a total of seven regions.
4. Notice a pattern: with each new straight line added, the number of new regions it creates is equal to the line's order (i.e., the 1st line creates 1 new region, the 2nd line creates 2 new regions, the 3rd line creates 3 new regions, and so on).
5. To find the total number of regions for $n$ straight lines, sum the number of new regions created by each line. This is a simple arithmetic progression, so you can use the formula for the sum of an arithmetic series:
$$\frac{n(n+1)}{2}$$
6. Thus, when $n$ infinitely long straight lines lie on a plane in such a way that no two of the lines are parallel and no three of the lines intersect at a single point, the arrangement divides the plane into $\frac{n^2 + n}{2}$ regions.
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use det() to calculate the determinant of n100. based on this information, do you think that n100 is invertible?
If det(n100) is equal to zero, then n100 is not invertible.
However, if det(n100) is non-zero, then n100 is invertible.
Given that the determinant of a matrix is a value associated with a square matrix, we can use det() to calculate the determinant of n100, as shown below: det(n100)
Based on this information, we cannot conclude whether or not n100 is invertible.
However, we can use the following statement to determine whether or not a matrix is invertible:
A matrix is invertible if and only if its determinant is non-zero.
If det(n100) is equal to zero, then n100 is not invertible.
However, if det(n100) is non-zero, then n100 is invertible.
Therefore, the determinant is an important tool that can help us determine whether or not a matrix is invertible.
Therefore, we must calculate det(n100) to determine if n100 is invertible or not.
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Six flags Great America sells adult tickets for $68 each and children tickets for $47 each. A middle school wants to take students and teachers on a field trip to Six Flags for spring break. The school has a budget of spending at most $12000. They can also only take no more than 225 teachers and students.
The school can purchase 91 adult tickets and 41 children tickets, allowing for a total of 132 teachers and students to go on the trip within the budget of $12000.
Let's start by defining some variables to represent the quantities we're interested in: Let A be the number of adult tickets purchased. Let C be the number of children tickets purchased. Let T be the total number of teachers and students who go on the trip. To maximize the number of teachers and students while staying within budget, we can use linear programming. The objective function is N = T - A - C, where N is the number of teachers and students. The inequalities are 68A + 47C ≤ 12000 and T ≤ 225. Solving this linear program, we find that the school can purchase 91 adult tickets and 41 children tickets, allowing for a total of 132 teachers and students to go on the trip within the budget of $12000.
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the complete question :
A middle school wants to take students and teachers on a field trip to Six Flags Great America for spring break. The school has a budget of spending at most $12,000. They can also only take no more than 225 teachers and students. The adult tickets cost $68 each, and children tickets cost $47 each. How many adults and children can the school take to Six Flags within the given budget and attendance limit?
Plssss help I have no idea the answer to this question
Answer:
circle K has greater area that circle J by 2000.18 cm sq.
Step-by-step explanation:
area of circle => π r^2
area of circle j = 3.14 x 18 x 18 = 1017.36
area of circle K = 3.14 x 31 x 31 =3017.54
the difference in their areas : 3017.54- 1017.36 = 2000.18
100 points please bell
The quadratic equation in standard form is 4x² + x + 19 = 0.
What is an equation?A mathematical definition of an equation is a claim that two expressions are equal when they are joined by the equals sign ("="). The two most well-known groups of equations in algebra are the linear equations and the polynomial equations. The phrase "equation in one variable" refers to an equation with just one variable. The following are a few crucial equation types: Linear equations, Quadratic equations, Cubic equation, and Quartic equations.
The standard form of the quadratic equation is:
ax² + bx + c = 0
The given equation is:
-4x² - 19 = x
Add 4x² on both sides of the equation:
-19 = 4x² + x
Add 19 on both sides of the equation:
4x² + x + 19 = 0
Hence, the quadratic equation in standard form is 4x² + x + 19 = 0.
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The polynomial has been factored completely. What are the zeros of the function?
x2-2x-48-(x+6)(x-8)
x=6 and x=8
x=-6 and x=8
x = 6 and x = -8
x = -6 and x = -8
The zeroes of the factored polynomial as required to be determined in the task content are: x = -6 and x = 8.
What are the zeroes of the factorised polynomial?It follows from the task content that the zeroes of the completely factorised polynomial are to be determined.
Since the given polynomial is; x² - 2x - 48 which has been factorised completely to; (x + 6) (x - 8).
Ultimately, the zeroes of the Polynomial are as follows;
x + 6 = 0; x = -6.
and
x - 8 = 0; x = 8.
Conclusively, the zeroes of the polynomial are; x = -6 and x = 8.
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the club has 20 members, 7 of whom are seniors. if you pick a committee of 3 from this club, what is the probability that all 3 are seniors?
Answer:
7/20
Step-by-step explanation:
ok so it has 30 members, 7 are seniors it's possible. if there is multiple choice just let me know if it is not on there.
Can you please show the steps on how to get this?
Answer:
The total volume of the space is 55,000 cm³
Step-by-step explanation:
First, figure out the length for each of the two prisms. The prism on the right has a length of 25 cm, so we can subtract that from 50 cm (the combined length of both prisms) to get 25 cm.
Next, figure out the volume of each area. For a rectangular prism, Volume = length · width · height. The left prism's volume is 30,000 cm³ (do 25 · 60 · 20) while the right prism's volume is 25,000 cm³ (do 25 · 25 · 40).
Lastly, add the volumes together to get the total volume, which is 55,000 cm³
joe scored in the 20th percentile on a standardized test. he brags to his friends that he scored better than 80% of the people who took the test. joe is .
Joe is incorrect in claiming that he scored better than 80% of the people who took the test.
The 20th percentile means that Joe's score was equal to or greater than 20% of the other test takers, but lower than 80%. The percentile is not a percentage, so the statement Joe made is false.
It is important to understand that percentile rankings are not the same as percentages. Percentile rankings measure how one’s score compares to others who have taken the same test. For example, if Joe scored in the 20th percentile, it means that 20% of the other test takers had the same or lower scores. On the other hand, percentages measure a proportion of the whole. In Joe's case, 80% would mean that 80 out of 100 test takers had a higher score than Joe.
To be more accurate, Joe could have said that he scored better than 20% of the people who took the test. Percentile rankings are often used to measure an individual's performance in comparison to a larger group of peers. Although Joe might have performed well, it is important to understand the difference between percentile and percentage.
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the average speed of a car on the highway is 85 kmph with a standard deviation of 5 kmph. assume the speed of the car, x, is normally distributed. find the probability that the speed is less than 80 kmph. round your answer to four decimal places.
The probability that the speed is less than 80 kmph is 0.1587 (rounded to four decimal places).
The average speed of a car on the highway is 85 kmph with a standard deviation of 5 kmph.
Assume the speed of the car, x, is normally distributed.
The probability that the speed is less than 80 kmph is required.
We will use the Z-score formula to solve this problem.
Z-score formula:
Z = (X - μ) / σWhereX = 80 (the speed we are interested in)
μ = 85 (mean of the normal distribution)
σ = 5 (standard deviation of the normal distribution)
Z = (80 - 85) / 5 = -1
The Z-score for the speed of 80 kmph is -1.
Using the standard normal distribution table,
we find that the probability that the Z-score is less than -1 is 0.1587 (rounded to four decimal places).
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What is 2^5 help plsss
Answer: 32
Step-by-step explanation:
Answer:
Step-by-step explanation:
2 is the base and 5 is the exponent, so we have to multiply 2 5 times.
2*2*2*2*2=32
Please help with #10 and #13!!
The angle of rotation in standard form is 251.5651 degrees.
The length of arc S is approximately 20.94 feet.
How do we solve this?If the point (-1, -3) is on the circle x² + y² = 10, then we can substitute these values for x and y in the equation to obtain:
(-1)² + (-3)² = 10
1 + 9 = 10
So, the point (-1, -3) satisfies the equation of the circle.
To find the angle of rotation in standard form, we need to use the formula:
tan(θ) = y/x
where θ is the angle of rotation.
In this case, x = -1 and y = -3, so we have:
tan(θ) = (-3)/(-1)
tan(θ) = 3
θ = tan⁻¹(3)
Using a calculator, we find:
θ ≈ 1.2490 radians or 71.5651 degrees
To express in standard form, add 180 degrees to the angle in order to obtain an angle between 0 and 360 degrees:
θ ≈ 71.5651 + 180 ≈ 251.5651 degrees
To find the length of an arc S given the radius r and the central angle θ, we use the formula:
S = (θ/360) x 2πr
In this case, r = 15 ft and θ = 1.396 radians
Substituting the values:
S = (1.396/2π) x 2π(15 ft)
S ≈ 1.396 x 15 ft
S ≈ 20.94 ft
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Complete question:
Consider the point (-1, -3), which is on the circle x² + y² = 10. Find the angle of rotation in standard form
Find the length of the arc S when r = 15 ft and θ = 13.96°
Sheldon harvests the strawberries and the tomatoes in his garden. He picks 1 1/5 kg less strawberries in the morning than in the afternoon. If Sheldon picks 2 1/3 kg in the morning, how many kilograms of strawberries does he pick in the afternoon? Explain your answer using words, pictures, or equations.
Answer:
[tex]\frac{32}{15}[/tex]
Step-by-step explanation:
afternoon=[tex]\frac{21}{3}[/tex] +[tex]\frac{11}{5}[/tex]
L.C.M=15
[tex]\frac{21+11}{15}[/tex]
[tex]\frac{32}{15}[/tex]
which pair of functions are inverses of each other?
The inverse functions of f(x) = 8x - 3 is correct as [tex]\rm g(x) = \tfrac{x + 3}{8}[/tex]. Thus, the correct option is D.
When does the inverse function come into play?
Because they allow mathematical operations to be reversed, inverse procedures are critical for solving equations.
The inverse functions of f(x) = 8x - 3 is correct as g(x) = (x + 3)/8
As,
f(x) = 8x - 3
Rewrite your term as
x = 8y − 3
Solve for y
x = 8y − 3
8y = x + 3
[tex]$ \rm y = \frac{x + 3}{8}[/tex]
Change y with g(x)
Then you have g(x) = (x + 3)/8
Thus, The inverse functions of f(x) = 8x - 3 is correct as [tex]\rm g(x) = \tfrac{x + 3}{8}[/tex]. Thus, the correct option is D.
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Problem 4. 3 (a) Suppose ψ(r, θ, d) Ae-r/a, for some constants A and a. Find E and V(r), assuming V(r) 0 asroo (b) Do the same for ψ(r, θ, φ)--Ae-r2/a2, assuming V(0) 0
(a) The wave function (r,, d) = Ae(-r/a), with A and a constants. To determine the expected value of energy E, we must first compute |H|>, where H is the Hamiltonian operator.
H = -(2/2m) 2 + V(r) is the Hamiltonian operator for a particle in a spherically symmetric potential, where is the reduced Planck constant, m is the particle's mass, 2 is the Laplacian operator, and V(r) is the potential energy. We may assume that V(r) = 0 as r approaches infinity since the potential energy V(r) is given to be zero at infinity. As a result, the Laplacian operator in spherical coordinates is reduced to 1/r2(d/dr)(r2(d/dr)), and we obtain:[tex]< ψ|H|ψ > = ∫∫∫ ψ*(r,θ,φ) [-2/2m (1/r2)(d/dr)(r2(d/dr)) + V(r) (r,,)] dτ where d = r2 sin dr d d d[/tex] is the volume element. Using the given wave function and the simplification of the Laplacian operator,
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Rickey bought a 35 pound bag of dog food . His dog eats an average of 3.5 pounds a day . How many pounds will remain in the bag after 8 days
Answer:
7 pounds
Step-by-step explanation:
3.5×8=28 pounds
35-28=7 pounds
so 7 pounds will b left
Which of the following proportions is true?
16/36 = 12/27
4/16 = 2/14
15/20 = 24/36
12/15 = 47/50
Answer:
16/36 = 12/27
diana ran a race of 700 meters in two laps of equal distance. her average speeds for the first and second laps were 7 meters per second and 5 meters per second, respectively. what was her average speed for the entire race, in meters per second?
Diana's average speed for the entire race was approximately 0.583 meters per second.
We can start by using the formula
average speed = total distance / total time
We know that Diana ran a total distance of 700 meters, and we can find the total time by adding the time for the first lap and the time for the second lap. Let's call the distance of each lap "x"
total distance = 700 meters
distance for each lap = x meters
So, the total time is
total time = time for first lap + time for second lap
To find the time for each lap, we can use the formula
time = distance / speed
For the first lap, we have
time for first lap = x / 7
For the second lap, we have
time for second lap = x / 5
So, the total time is
total time = (x / 7) + (x / 5)
We can simplify this by finding a common denominator
total time = (5x + 7x) / (35)
total time = (12x) / 35
Now, we can substitute the values we have into the formula for average speed
average speed = total distance / total time
average speed = 700 / [(12x) / 35]
average speed = (700 × 35) / (12x)
average speed = 204.166... / x
To find the average speed for the entire race, we need to find the value of "x" that makes this expression true. We know that the two laps are equal in distance, so we can set
x + x = 700
2x = 700
x = 350
Substituting this value of "x" into the expression for average speed, we get
average speed = 204.166... / 350
average speed ≈ 0.583 meters per second
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