Answer:
The answer is Sin B
Step-by-step explanation:
I remember in 8th grade doing this
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How much water should be added to 1 gallon of pure antifreeze to obtain a solution that is 95% antifreeze?
To obtain a 95% antifreeze solution,
(Simplify your answer.)
***
gallon(s) of water should be added.
4
Therefore, we need to add approximately 0.0526 gallons of water (which is equivalent to about 6.63 fluid ounces) to 1 gallon of pure antifreeze to obtain a solution that is 95% antifreeze.
What is equation?In mathematics, an equation is a statement that asserts the equality of two expressions. An equation typically consists of one or more variables, coefficients, and constants, and it can include mathematical operations such as addition, subtraction, multiplication, and division. The expressions on both sides of the equation are separated by an equal sign, indicating that they have the same value. The goal of solving an equation is to determine the value of the variables that make the equation true. Equations are used in many areas of mathematics and science to model real-world phenomena and solve problems.
Here,
Let's assume that we need to add x gallons of water to 1 gallon of pure antifreeze to obtain a solution that is 95% antifreeze. We know that the final solution will contain 1 gallon of antifreeze, and that this will be 95% of the total solution (the remaining 5% will be water). So, we can write:
1 gallon of antifreeze = 95% of (1 gallon of antifreeze + x gallons of water)
We can simplify this equation by converting 95% to a decimal:
0.95 × (1 gallon of antifreeze + x gallons of water) = 1 gallon of antifreeze
Now we can solve for x by isolating it on one side of the equation. First, let's distribute the 0.95:
0.95 gallons of antifreeze + 0.95x gallons of water = 1 gallon of antifreeze
Next, let's isolate x by subtracting 0.95 gallons of antifreeze from both sides:
0.95x gallons of water = 0.05 gallons of antifreeze
Finally, we can solve for x by dividing both sides by 0.95:
x = 0.05 gallons of antifreeze ÷ 0.95
x ≈ 0.0526 gallons of water
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Joe's Diner serves omelets all day long. Joe gets his shipment of eggs each morning. After Joe makes one omelet he has 177 eggs remaining, after two omelets he has 174 eggs remaining, and after making 3 omelets he has 171 eggs remaining.
(1) What type of sequence is represented in this scenario?
(2) Write a recursive formula to show the mumber of remaining eggs after each omelet is made.
(3) Write an explicit formula to show the number of remaining eggs after each omelet is made.
(4) How many eggs will Joe have left after he makes 42 omelets?
Answer: (1) The scenario represents an arithmetic sequence because each time an omelet is made, the number of remaining eggs decreases by the same amount.
(2) Let's denote the number of remaining eggs after making the n-th omelet by a_n. We can see from the problem statement that the difference between any two consecutive terms in the sequence is constant. Let d be a common difference. Then, we have:
a_{n+1} = a_n - d
Using the information from the problem statement, we can find the value of d:
a_2 - a_1 = 174 - 177 = -3
a_3 - a_2 = 171 - 174 = -3
Since the difference is the same in both cases, we have d = -3. Therefore, the recursive formula is:
a_{n+1} = a_n - 3, with a_1 = 177.
(3) To find an explicit formula, we can use the recursive formula to derive a general expression for a_n. Starting with the recursive formula, we have:
a_2 = a_1 - 3
a_3 = a_2 - 3 = a_1 - 23
a_4 = a_3 - 3 = a_1 - 33
a_5 = a_4 - 3 = a_1 - 4*3
We can see that the general expression for a_n is:
a_n = a_1 - (n-1)*3
Substituting a_1 = 177, we get:
a_n = 180 - 3n
Therefore, the explicit formula for the number of remaining eggs after making the n-th omelet is a_n = 180 - 3n.
(4) To find the number of eggs Joe will have left after making 42 omelets, we can simply substitute n = 42 into the explicit formula:
a_{42} = 180 - 3*42 = 54
Therefore, Joe will have 54 eggs left after making 42 omelets.
Step-by-step explanation:
The perimeter of Aaron’s rectangular bedroom is 368 inches. His room is 8 feet wide. What is the area of Aaron’s bedroom?
The answer of the given question based on the area of Aaron’s bedroom is 8,448 inches².
What is Perimeter?Perimeter is total distance around boundary of two-dimensional shape. It is sum of the lengths of all sides of the shape. For example, the perimeter of a rectangle is found by adding the length and width of the rectangle and multiplying the sum by 2, while the perimeter of a circle is found by multiplying the diameter by π. Perimeter is usually measured in units like inches, feet, meters, or centimeters.
We can begin by converting the width of the room from feet to inches, since the given perimeter is in inches:
8 ft = 8x12 inch =96 inch
Let the length of the room be L. Then, the perimeter P is given by the formula:
P = 2L + 2W
Substituting the given values, we have:
368 = 2L + 2(96)
368 = 2L + 192
2L = 176
L = 88 inches
So, the length of the room is 88 inches. The area A of the room is given by the formula:
A = L x W = 88 x 96 = 8,448 inches²
Therefore, the area of Aaron's bedroom is 8,448 inches².
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The sum of the interior angles of an octagon is:
0000
1080°.
180°.
360°.
720⁰.
Answer:
1080°
Step-by-step explanation:
Let n = the number of sides
(n-2)180
(8-2)180
6(180) = 1080
Helping in the name of Jesus.
when the decimal point of a certain positive decimal number is moved four places to the right, the new number is four times the reciprocal of the original number. what is the orignal number?
If the new number is four times the reciprocal of the original number, then the original number is 0.02.
Let us assume the original positive decimal number is = "x".
When we move the decimal point of x four places to the right,
We get, "10000x", which is four times the reciprocal of x.
So, equation can be written as;
⇒ 10000x = 4(1/x),
On simplifying the equation,
We get,
⇒ 10000x² = 4,
Dividing both sides by 10000,
We get,
⇒ x² = 0.0004,
Simplifying further,
We get,
⇒ x = 0.02
Therefore, the original positive decimal number is 0.02.
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Rowan is taking his siblings to get ice cream. they can't decide whether to get a cone or a cup because they want to get the most ice cream for their money. if w = 2.5 in, x = 5 in, y = 5 in, z = 3 in, and the cone and cup are filled evenly to the top with no overlap, which container will hold the most ice cream? use 3.14 for π, and round your answer to the nearest tenth. a cone with a height of x and a radius of w, a cylinder with a diameter of y and a height of z the cup holds 26.2 in3 more ice cream than the cone. the cone holds 26.2 in3 more ice cream than the cup. the cup holds 32.7 in3 more ice cream than the cone. the cone holds 32.7 in3 more ice cream than the cup.
Rowan should get the ice cream in a cup as the cup holds 26.2 in3 more ice cream than the cone.
First, we need to find the volume of ice cream that the cone holds:
we can use the formula for volume, we get:
Volume = π × r² × h/3
when we put the values in the formula, we get:
Volume = 3.14 × 2.5² × 5/3
solving the problem, we get:
Volume =32.7 inches³
Now we need to find the volume of ice cream that the cup holds,
we use the formula of volume, we get:
Volume = π × r² × h
Diameter = 5 inches ⇒ Radius = 2.5 inches
(since we know that the radius is the exact half of the diameter)
when we put the values in the formula, we get:
Volume = 3.14 × 2.5² × 3
Volume =58.9 inches³
Now that we have both the values, we can easily find the difference:
Volume of the cup - volume of the cone = 58.9 - 32.7 = 26.2 inches³
The cup holds 26.2 in³ more ice cream than the cone.
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4.5 Draw a diagram representing the scenario and find the requested value. A man is standing 270 feet from the base of a statue. If he man looks up at an angle of 34 degrees to see the top of the statue, how tall is the statuePlease round to the nearest whole foot.
Using the idea of the angle of elevation as it could be applied to the problem, the height of the statue is 182 ft
What is the angle of elevation?When gazing up at an object or point, the angle of elevation is the angle formed between the horizontal plane and the observer's line of sight. It is, in other words, the angle at which the line of sight of an observer is tilted upward from the horizontal plane.
The angle of elevation is an important concept in geometry and trigonometry and is used to calculate the height of objects, such as buildings, towers, or trees, or to measure the distance between two points.
We know that;
Tan 34 = x/270
x = 270 tan 34
x = 182 ft
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Simplify to create an equivalent expression
2(-2-4p) + 2(-2p-1)
On solving the provided question we can say that Therefore, the simplified equivalent expression is -6 - 12p.
what is expression ?An expression in mathematics is a collection of representations, numbers, and conglomerates that mimic a statistical correlation or regularity. A real number, a mutable, or a mix of the two can be used as an expression. Mathematical operators include addition, subtraction, fast spread, division, and exponentiation. Expressions are often used in arithmetic, mathematics, and form. They are employed in the depiction of mathematical formulas, the solving of equations, and the simplification of mathematical relationships.
[tex]2(-2-4p) + 2(-2p-1) = -4 - 8p - 4p - 2\\-4 - 8p - 4p - 2 = -6 - 12p\\[/tex]
Therefore, the simplified equivalent expression is -6 - 12p.
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2 [x² + 2x + 1] - x²-4x+4 = x²-3x
The solution for the equation given would be x = 2 and x = -1.
How to find the solution to the equation?To solve the equation 2[x² + 2x + 1] - x² - 4x + 4 = x² - 3x, we can simplify and rearrange the terms as follows:
2x² + 4x + 2 - x² - 4x + 4 = x² - 3x
x² - 3x + 6 = x² - 3x
2x² - 2x - 6 = 0
Dividing both sides by 2, we get:
x² - x - 3 = 0
We can then solve for x by factoring or using the quadratic formula. Factoring gives:
(x - 2)(x + 1) = 0
So, the solutions are x = 2 and x = -1.
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chris rents a booth at a flea market at a cost of $75 for one day. at the flea market chris sells picture frames each of which costs him $6.00. if chris sells each picture frame for $13, how many picture frames must he sell to make a profit of at least $200 for that day?
Answer:
x ≤ 40
Step-by-step explanation:
-75-6x+13x ≤ 200
-75 is the cost of the booth a day
-6 is the intial cost of the paintings for Chris
x is the amount of paintings
13 is the price Chris sells the paintings for
200 is the profit needed
First thing you do is add like terms -75-6x+13x ≤ 200
add -6x and 13x
-75+7x ≤ 200
Now add 75 to both sides
7x ≤ 275
Now divide both sides by 7
x≤ 275
x≤ 39.2857142857
round up to x≤ 40 (because 39 paintings is not enough, 40 gives him $205 in profit while 39 only gives him $198 in profit)
Tiffany and Clara work as lifeguards at a community pool during the summer. The table shows Tiffany's earnings and the graph shows Clara's earnings for working different numbers of hours. Who is earning money at a faster rate? How much more per hour does that person earn?
Clara is earning money at a faster rate than Tiffany, with a difference of $4 per hour.
Define the term graph?A graph in x-y axis plot is a visual representation of mathematical functions or data points on a Cartesian coordinate system.
To determine who is earning money at a faster rate, we need to calculate the hourly earnings for each person.
For Tiffany, the hourly earnings can be calculated as follows:
Hourly earnings = Earnings / Time
Hourly earnings = 40 / 5 = 8
Hourly earnings = 80 / 10 = 8
Hourly earnings = 120 / 15 = 8
So, Tiffany's hourly earnings are a constant $8 per hour.
For Clara, we can estimate her hourly earnings from the graph. The graph shows that Clara earns $60 for 5 hours of work, $120 for 10 hours of work, and $180 for 15 hours of work. Therefore, her hourly earnings can be calculated as follows:
Hourly earnings = Earnings / Time
Hourly earnings = 60 / 5 = 12
Hourly earnings = 120 / 10 = 12
Hourly earnings = 180 / 15 = 12
So, Clara's hourly earnings are a constant $12 per hour.
Thus, Clara is earning money at a faster rate than Tiffany, with a difference of $4 per hour.
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Complete question-
PLEASE CAN SOMEONE HELP ME WITH THIS
The pricing for purchasing apples from the orchard, stating that for the first 10 pounds, the price is $2 per pound, and for each additional pound, the price is $1 per pound.
What is the unit price?
In order to find the unit price of a certain item, we just need to divide the total price paid (or total cost) by the amount of items bought.
If Anne buys less than or equal to 10 pounds of apples from David's Apple Orchard, then she will pay $2 per pound.
If she buys more than 10 pounds, then she will pay $1 per pound for each additional pound after the first 10 pounds.
To buy apples from David's Apple Orchard, Anne has to follow these rules
For the first 10 pounds of apples, she will pay $2 per pound.
For each additional pound of apples after the first 10 pounds, she will pay $1 per pound.
Hence, the pricing for purchasing apples from the orchard, stating that for the first 10 pounds, the price is $2 per pound, and for each additional pound, the price is $1 per pound.
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An electrician leans an extension ladder against the outside wall of a house so that it reaches an electric box 31 feet up. The ladder makes an angle of 78 degrees with the ground. Find the length of the ladder
The length of the ladder can be calculated using trigonometry as 31/sin 78.
The length of the ladder can be calculated using trigonometry. First, use the given information to draw a diagram. The angle of 78 degrees forms the angle of the ladder relative to the ground, and the side opposite of this angle is the length of the ladder. The side adjacent to the angle is the height of the electric box, which is given as 31 feet.
Now, use the sine function to calculate the length of the ladder. The sine function relates the ratio of the opposite side to the hypotenuse, so the equation is 31/sin 78.
Plugging this equation into a calculator will give the length of the ladder as approximately 51.7 feet.
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What is the factored form of the polynomial? x2 − 15x 36 (x − 4)(x − 9) (x − 3)(x − 12) (x 4)(x 9) (x 3)(x 12)
Coefficients and indeterminates are both parts of polynomials. The polynomial [tex]x^{2}[/tex] - 15x + 36 has the components (x-3) (x-12).
To factor the polynomial [tex]x^{2}[/tex]- 15x + 36, we need to find two numbers whose product is 36 and whose sum is -15. These numbers are -3 and -12,
=[tex]x^{2}[/tex] -12x -3x + 36
now, we'll use x as the common term between the first two terms and 3 as the common term between the next two terms.
=x(x-12)-3(x-12)
=(x-12)(x-3)
so we can write the polynomial as (x - 3)(x - 12). This is the factored form of the polynomial.
To verify this, we can expand the expression (x - 3)(x - 12) using the distributive property, which gives us [tex]x^{2}[/tex]- 15x + 36. This confirms that the factored form is correct.
Factoring polynomials is an important skill in algebra as it helps simplify expressions and solve equations more easily. By factoring a polynomial, we can often find its roots, which are the values of x that make the polynomial equal to zero. This is useful in solving various types of problems in mathematics and science.
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Which represents the solution to the inequality x6. 2≥ −2 ? x ≥ 12. 4 x ≥ −12. 4 x ≤ −12. 4
The inequality x/6.2 ≥ -2 is solved by multiplying both sides by 6.2 to get x ≥ -12.4, which means x is greater than or equal to 12.4.
To solve the inequality x/6.2 ≥ -2, we want to find all possible values of x that make the inequality true.
First, we can isolate x by multiplying both sides of the inequality by 6.2 (which is positive, so we do not need to flip the inequality sign):
x/6.2 * 6.2 ≥ -2 * 6.2
Simplifying, we get:
x ≥ -12.4
This means that any value of x that is greater than or equal to -12.4 will make the inequality true.
To see why this is the case, we can substitute a few values for x and see if they satisfy the inequality. For example, if we let x = 12.4, then:
x/6.2 = 12.4/6.2 = 2
And we can check that 2 is indeed greater than or equal to -2. Therefore, x = 12.4 is a valid solution.
Similarly, if we let x = 20, then:
x/6.2 = 20/6.2 ≈ 3.23
And we can check that 3.23 is also greater than or equal to -2. Therefore, x = 20 is also a valid solution.
However, if we let x = -15, then:
x/6.2 = -15/6.2 ≈ -2.42
And we can see that -2.42 is not greater than or equal to -2. Therefore, x = -15 is not a valid solution.
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Find the cross product a ⨯
b. A = 4, 5, 0 , b = 1, 0, 3 verify that it is orthogonal to both a and
b. (a ⨯
b. · a = (a ⨯
b. · b =
Answer:
cross product {15, -12, -5}dot products with 'a' and 'b': 0 and 0Step-by-step explanation:
For vectors a = {4, 5, 0} and b = {1, 0, 3}, you want the cross product and verification that the cross product is orthogonal to both 'a' and 'b'.
Cross productThe cross product of 4i+5j+0k and 1i+0j+3k is the determinant ...
[tex]\left|\begin{array}{ccc}i&j&k\\4&5&0\\1&0&3\end{array}\right|=15i-12j-5k[/tex]
As a list of coefficients, the cross product is c = {15, -12, -5}.
OrthogonalVectors are orthogonal if their dot product is 0.
a·c = {4, 5, 0}·{15, -12, -5} = (4·15) -(5·12) +(0·(-5)) = 60 -60 = 0
b·c = {1, 0, 3}·{15, -12, -5} = (1·15) +(0·(-12)) +(3·(-5)) = 15 -15 = 0
The dot products are both zero, so the cross product is orthogonal to both of the vectors that created it.
The cross product of vectors a and b is 15i - 12j - 5k. To verify if it is orthogonal to both a and b, we calculate the dot products and find that they both equal zero.
Explanation:The cross product of vectors a and b is given by:
a ⨯ b = (aybz - azby)i + (azbx - axbz)j + (axby - aybx)k
Calculating the cross product of a and b using the given values:a ⨯ b = (5)(3) - (0)(0)i + (0)(1) - (4)(3)j + (4)(0) - (5)(1)k = 15i - 12j - 5k
To verify if the cross product is orthogonal to both a and b, we calculate the dot products:
(a ⨯ b) · a = (15)(4) + (-12)(5) + (-5)(0) = 0
(a ⨯ b) · b = (15)(1) + (-12)(0) + (-5)(3) = 0
Since both dot products equal zero, we can conclude that the cross product a ⨯ b is orthogonal to both a and b.
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Un número excede en 12 unidades a otro, si restáramos 4 unidades a cada uno de ellos, entonces el primero sería igual al doble del segundo. Halle los dos números
x - numero primero
y - numero segundo
x = y + 12
x - 4 = 2(y - 4)
x - y = 12
x - 4 = 2y - 8
- x + y = - 12
x - 2y = - 4
_______________
- y = - 16
y = 16
x = 16 + 12
x = 28
For a role-playing game, Nikia randomly selects a team card and a character card. The teams are air, fire, land, and water. The characters are healer, spy, and thief. Nikia's favorite team is air and her favorite character is spy. How many outcomes are there? (Hint-Use a tree diagram, table, or list)
Answer:
To determine the number of outcomes for Nikia's random selection of a team card and a character card for a role-playing game, we can use a tree diagram, table, or list.
There are four possible teams: air, fire, land, and water. Once a team card is selected, there are three possible character cards: healer, spy, and thief. Therefore, the total number of outcomes is the product of the number of options for each selection, which is:
4 (number of team options) x 3 (number of character options) = 12
So there are 12 possible outcomes for Nikia's random selection of a team card and a character card. However, since Nikia has specified that her favorite team is air and her favorite character is spy, the number of outcomes that would satisfy her preferences is:
1 (air team) x 1 (spy character) = 1
Therefore, only one outcome would satisfy Nikia's preferences.
What is the graph of the equation x=5
The graph of x=5 is a line parallel to the y-axis, with x-coordinate 5 at all points.
What is the vertical line?
A vertical line is a straight line that is perpendicular to the horizontal line and goes straight up and down in a two-dimensional coordinate system.
The graph of the equation x=5 is a vertical line passing through the point (5, y) for all values of y.
This is because no matter what value y takes, x will always be equal to 5.
Here's in image example of what the graph of x=5 would look like:
As you can see in the image attached, the line is vertical and intersects the x-axis at x=5.
Therefore, the graph of x=5 is a line parallel to the y-axis, with x-coordinate 5 at all points.
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Jozef "accidentally" broke his piggy bank to find a total of 42 dimes and quarters. If the coins totaled $8.25, how dimes did he have in his piggy bank? How many quarters?
Therefore, Jozef had 15 dimes and 27 quarters in his piggy bank.
What is equation?An equation is a mathematical statement that shows that two expressions are equal. It typically consists of variables, constants, and mathematical operations. Equations can be solved by manipulating the expressions to find the value of the variables that satisfy the equation. Equations can be used to model real-world situations, and they are an important tool in many fields, including mathematics, physics, engineering, and economics.
Here,
Let's use the following variables to represent the number of dimes and quarters in Jozef's piggy bank:
d: the number of dimes
q: the number of quarters
We know that Jozef has a total of 42 dimes and quarters, so we can write the equation:
d + q = 42
We also know that the total value of the coins is $8.25. We can express this value in cents as:
10d + 25q = 825
We can simplify this equation by dividing both sides by 5:
2d + 5q = 165
Now we have two equations with two variables:
d + q = 42
2d + 5q = 165
We can use the first equation to solve for one of the variables in terms of the other. For example, we can solve for q:
q = 42 - d
Now we can substitute this expression for q into the second equation:
2d + 5(42 - d) = 165
Simplifying and solving for d, we get:
2d + 210 - 5d = 165
-3d = -45
d = 15
So Jozef had 15 dimes in his piggy bank. We can use the first equation to find the number of quarters:
15 + q = 42
q = 27
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Solve these two questions fast for brainliest and 20 points
Sonya is approximately 47 feet away from Thomas. And
height of the kite above the ground is approximately 43 feet.
How to find the height?
To find the height of the kite above the ground, we can use trigonometry. Let's draw a diagram:
/|
/ |
/ | height (h)
/ |
/ |
/θ___|___
distance (d)
We know that the angle θ is 25°, the hand height is 3 feet, and the distance from the hand to the kite is 100 feet. We want to find the height of the kite above the ground, which we'll call h.
Using trigonometry, we can write:
tan(θ) = h / d
where tan(θ) is the tangent of the angle θ, and d is the distance from the hand to the kite. Solving for h, we get:
h = d * tan(θ)
Substituting the known values, we get:
h = 100 * tan(25°) ≈ 43.1 feet
So the height of the kite above the ground is approximately 43 feet.
2.Let's draw a diagram:
Sonya
|
|
66° | 48°
|
|
-----------o----------- Balloon
|
|
Thomas
We want to find the distance between Sonya and Thomas, which we'll call x. We know that the height of the balloon above the ground is 126 feet. We also know the angles of elevation from Sonya and Thomas to the balloon.
Let's first find the distance from Sonya to the balloon. We can use trigonometry again:
tan(66°) = 126 / d
where d is the distance from Sonya to the balloon. Solving for d, we get:
d = 126 / tan(66°) ≈ 50.5 feet
Now let's find the distance from Thomas to the balloon:
tan(48°) = 126 / (x + d)
where x + d is the total distance from Thomas to the balloon (the sum of the distances from Thomas to the point directly below the balloon, and from that point to the balloon). Solving for x + d, we get:
x + d = 126 / tan(48°) ≈ 97.5 feet
Finally, we can solve for x:
x = (x + d) - d ≈ 97.5 - 50.5 ≈ 47 feet
So Sonya is approximately 47 feet away from Thomas.
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can someone please help me with ??!!
The statement "The value is decreasing $207 per year" best explains how the value is changing. This is because the function shows that the value is decreasing linearly with time, at a rate of $82 per year. Therefore, over t years, the value will decrease by 82t dollars. For example, after one year, the value will decrease by $82, and after two years, it will decrease by $164.
Now check
Hi can someone help me with my math hw? can you solve it on paper pls?
[tex]\qquad \textit{Amount for Exponential Growth} \\\\ A=P(1 + r)^t\qquad \begin{cases} A=\textit{accumulated amount}\\ P=\textit{initial amount}\dotfill &50000\\ r=rate\to 5\%\to \frac{5}{100}\dotfill &0.05\\ t=years\\ \end{cases} \\\\\\ A = 50000(1 + 0.05)^{t} \implies A=50000(1.05)^t \\\\[-0.35em] ~\dotfill[/tex]
[tex]\stackrel{\textit{in 2017, 7 years later}}{A=50000(1.05)^7\implies A\approx 70355} \\\\\\ \stackrel{\textit{in 2020, 10 years later}}{A=50000(1.05)^{10}\implies A\approx 81444} \\\\\\ \stackrel{\textit{in 2030, 20 years later}}{A=50000(1.05)^{20}\implies A\approx 132664}[/tex]
A large container has a maximum capacity of 64 ounces. The container is filled with 8 ounces less than its maximum capacity. Answer parts a and b a. To what percent of its capacity is the large container filled? The container is filled to % of the maximum capacity. b. Some liquid will be poured from a full 16-ounce container until it is filled to the same percent of its capacity as the large container in part a. How many ounces of liquid must be poured from the full 16-ounce container? Explain When the 16-ounce container is % filled, it will contain ounce(s). So ounce(s) will need to be poured from the full 16-ounce container
We may conclude after answering the presented question that As a expression result, the huge container is at 87.5% of its full capacity.
what is expression ?An expression in mathematics is a collection of representations, numbers, and conglomerates that mimic a statistical correlation or regularity. A real number, a mutable, or a mix of the two can be used as an expression. Mathematical operators include addition, subtraction, fast spread, division, and exponentiation. Expressions are often used in arithmetic, mathematics, and form. They are employed in the depiction of mathematical formulas, the solving of equations, and the simplification of mathematical relationships.
The big container is 8 ounces less than its maximum capacity of 64 ounces, which indicates it is 64 - 8 = 56 ounces full.
We may use the following formula to calculate the proportion of the container's capacity that is filled:
(Amount filled / Maximum capacity) x 100% = Percentage filled
Substituting the values yields:
% filled = (56 / 64) x 100%
87.5% of the spaces were filled.
As a result, the huge container is at 87.5% of its full capacity.
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PLEASE HELPPP WITH MY MATHS ASSIGNMENT
a) The accumulated amount or future value of investing $150 on the first day of each month at 6% compounded monthly for 40 years is $274,152.43.
b) , The future value of the investment after 40 years at an annual interest rate of 4%, compounded semi-annually, is $9,054.60.
a)
N = 40 years * 12 months = 480 months
I% = 6% per year / 12 months = 0.5% per month
PV = $0 (since we are not investing any money initially)
PMT = $150
FV = ?
P/Y = 1 (payments made monthly)
C/Y = 12 (compounded monthly)
Using the formula for future value of an annuity:
FV = PMT * ((1 + I%)^(N) - 1) / I%
FV = $150 * ((1 + 0.5%)^(480) - 1) / 0.5%
FV = $274,152.43
Therefore, the accumulated amount or future value of investing $150 on the first day of each month at 6% compounded monthly for 40 years is $274,152.43.
b)
Given information:
PV (present value) = $900
I% (annual interest rate) = 4%
P/Y (payments per year) = 1 (since the investment is compounded semi-annually)
C/Y (compounding periods per year) = 2
N (number of periods) = 40 years * 2 (since interest is compounded twice a year) = 80
Using the compound interest formula:
FV = PV * (1 + (I%/C/Y))^(N*C/Y)
FV = $900 * (1 + (4%/2))^(80*2)
FV = $900 * (1.02)¹⁶⁰
FV = $900 * 10.06
FV = $9,054.60
Therefore, the future value of the investment after 40 years at an annual interest rate of 4%, compounded semi-annually, is $9,054.60.
PMT (payment per period) cannot be calculated since no periodic payments are mentioned in the given information.
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Math help . Find x in the problem please
Answer:
x=56 feet
Step-by-step explanation:
This problem uses trigonometry.
Tangent of an angle equals opposite/adjacent.
Tan(35)=(x/80)
(.700)=(x/80)
(80)(.700)=x
56.0166=x
=
(7−4n)⋅6 equation’s
Answer:
-17
Step-by-step explanation:
1st step =7-4 X 6
2nd step =7-24
3rd step =-17
What the median of 11, 31, 17, 22, 18, 25, 25, 10, 15, 12, 30, 12, 29, 25, 21, 32, 30, 25
Answer:
What is the median of - 11, 31, 17, 22, 18, 25, 25, 10, 15, 12, 30, 12, 29, 25, 21, 32, 30, 25?
10, 11, 12, 12, 15, 17, 18, 21, 22, 25, 25, 25, 25, 29, 30, 30, 31, 32
25 + 25
= 5050 ÷ 2
= 25Step-by-step explanation:
You're welcome.
The Jones’ family eats 572 bananas each year. How many do they average eating in one week
Answer:
10 / 11 bananas in one week, I believe.
what is the minimum vertical ceiling height to play indoor volleyball?
Answer:
USA Volleyball specifies a minimum ceiling height of 23′ for nationally sanctioned competition.
Step-by-step explanation:
its height regulation of how tall the ceiling should be