The answer of the given question based on the finding the adjoint of M is 16 -4 -33
-12 -5 -12.
What is Co-factor?In linear algebra, a cofactor is a scalar value that can be computed for each element of a square matrix. To find the cofactor of a specific element of a matrix, we first remove the row and column containing that element, and then compute the determinant of the remaining matrix. The sign of the cofactor depends on the position of the element within the matrix: it is positive if the sum of the row and column indices is even, and negative if the sum is odd.
The cofactor matrix of a given matrix is obtained by replacing each element of the matrix with its corresponding cofactor. Cofactor matrices are useful in computing the inverse of a matrix and in solving systems of linear equations.
The adjoint of matrix is transpose of its co-factor matrix.
First, we need to find the transpose of the co-factor matrix:
16 -12
-4 -5
-33 -12
Therefore, the adjoint of M is:
16 -4 -33
-12 -5 -12
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Decompose and find the area of the composite figure
The composite figure has a total area of 102 square units (80 + 16 + 6 square units). Consequently, the composite figure has a 102 square unit area.
How can you calculate a composite figure's entire surface area?Composite things that are three dimensional (3D) are constructed from two or more separate pieces. Finding each item's outside surface area and adding the surface areas together will yield the surface area of a 3D composite object. Another way to divide it is into a top and a bottom.
We may divide the composite figure into smaller forms and sum up their areas to determine the area of the overall figure. Here is one method for breaking down the figure:
A rectangle and two triangles make up the figure.
The rectangle has an area of 80 square units since it is 10 units long and 8 units wide.
The two triangles have right triangles with four and six unit-long legs, respectively. The equation (base * height) / 2 may be used to calculate each triangle's area.
The area of the triangle on the left is (4 * 8) / 2 or 16 square units since its base is 4 units and its height is 8 units (the length of the rectangle).
The area of the triangle on the right is (6 * 2) / 2 or 6 square units because its base is 6 units and its height is 2 units (the distance between the bottom of the triangle and the bottom of the rectangle).
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y=-x+8 4x+y=5
Help me pls
Answer: x = -1 and y = 9
Step-by-step explanation:
To solve this system of equations, we can use the substitution method.
First, solve the first equation for y:
y = -x + 8
Now, substitute this expression for y into the second equation and solve for x:
4x + y = 5
4x + (-x + 8) = 5 (substituting -x + 8 for y)
3x + 8 = 5
3x = -3
x = -1
Now that we have found the value of x, we can substitute it back into one of the original equations to solve for y. Let's use the first equation:
y = -x + 8
y = -(-1) + 8
y = 9
Therefore, the solution to the system of equations is x = -1 and y = 9.
Please help me find the arc!!!
The length of the arc that is drawn in a circle of radius 14 cm and angle of arc 135° is approximately 32.67 cm.
What is an arc?An arc is a portion of a curve that is part of a circle. It is defined as a continuous portion of the circumference of a circle. In other words, an arc is a segment of a circle's circumference.
To find the length of an arc of circle, you can use the formula:
arc length = (angle of arc / 360) x (2 x π x radius)
Where π (pi) is a mathematical constant approximately equal to 3.14.
In this problem, the radius of the circle is given as 14 cm and the angle of the arc is 135°. So, By substituting these values in the formula, we get:
arc length = (135/360) x (2 x π x 14)
arc length = (3/8) x (2 x 3.14 x 14)
arc length = (3/8) x (87.92)
arc length = 32.67 cm (rounded to two decimal places)
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Use a graphing utility to graph the function and find the absolute extrema of the function on the given interval. (Round your answers to three decimal places. If an answer does not exist, enter DNE.)
Answer:
minimum: (0.345, -1.339)maximum: (0, 1)Step-by-step explanation:
You want the absolute extremes of f(x) = -x +cos(3πx) in the interval [0, π/6].
GraphThe attached graph shows the extremes to be ...
minimum: (0.345, -1.339)maximum: (0, 1)__
Additional comment
The x-value at the minimum is (π+arcsin(1/(3π)))/(3π) ≈ 0.344612473782. The corresponding y-value is about −1.33896758676.
A committee of ten health professionals has been selected to investigate the ethical conduct of some health workers in a health facility.A sub committees of four health professionals is to be selected out of the ten health professionals . Find how many ways this can happen
Answer:
Step-by-step explanation:
A person places $741 in an investment account earning an annual rate of 5.8%, compounded continuously. Using the formula V = Pe^{rt}V=Pe
rt
, where V is the value of the account in t years, P is the principal initially invested, e is the base of a natural logarithm, and r is the rate of interest, determine the amount of money, to the nearest cent, in the account after 13 years.
The nearest cent, the amount of money in the account after 13 years is $2,094.18.
The formula for continuous compound interest is:
V = Pe^(rt)
where V is the value of the account after t years, P is the principal (initial amount) invested, e is the base of natural logarithms (approximately 2.71828), r is the annual interest rate (as a decimal), and t is the time period in years.
In this case, P = $741, r = 0.058 (since the annual interest rate is 5.8%), and t = 13. Substituting these values into the formula, we get:
V = 741e^(0.058*13)
Using a calculator, we can evaluate e^(0.058*13) to be approximately 2.8302. Then, we can multiply this value by 741 to get:
V = 741*2.8302
V ≈ $2,094.18
Therefore, to the nearest cent, the amount of money in the account after 13 years is $2,094.18.
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These are the questions I was talking about
Tim's score range would be between 20.2 - 56.25 and 20.2 + 56.25, or between -36.05 and 76.45. To find the percentage of games
a. To find the percentage of candy wrappers that would have between 3.4 and 3.6 ounces, we need to calculate the z-scores for each of the values:
[tex]z-score for 3.4 ounces = (3.4 - 3.5) / 0.16 = -0.625[/tex]
[tex]z-score for 3.6 ounces = (3.6 - 3.5) / 0.16 = 0.625[/tex]
Using a z-table or a calculator with a normal distribution function, we can find that the percentage of candy wrappers between these two values is approximately 47.70%.
b. To find the percentage of candy wrappers that would have less than 3.3 ounces, we need to calculate the z-score for this value:
[tex]z-score for 3.3 ounces = (3.3 - 3.5) / 0.16 = -1.25[/tex]
Using a z-table or a calculator with a normal distribution function, we can find that the percentage of candy wrappers with less than 3.3 ounces is approximately 10.92%.
To find the percentage of candy wrappers with more than 3.62 ounces, we need to calculate the z-score for this value:
[tex]z-score for 3.62 ounces = (3.62 - 3.5) / 0.16 = 0.75[/tex]
Using a z-table or a calculator with a normal distribution function, we can find that the percentage of candy wrappers with more than 3.62 ounces is approximately 22.77%.
c. To find how many of the 1358 packets made that day have between 3.35 and 3.65 ounces, we need to convert these values to z-scores:
[tex]z-score for 3.35 ounces = (3.35 - 3.5) / 0.16 = -0.9375[/tex]
[tex]z-score for 3.65 ounces = (3.65 - 3.5) / 0.16 = 0.9375[/tex]
Using a z-table or a calculator with a normal distribution function, we can find the percentage of candy wrappers between these two values, which is approximately 62.97%. To find how many packets this represents, we can multiply this percentage by the total number of packets made:
[tex]0.6297 * 1358 = 856 packets[/tex]
Therefore, approximately 856 packets made that day have between 3.35 and 3.65 ounces.
d. To find how many games Tim would have scored 22 points or more if he plays 32 games, we first need to calculate the z-score for this value:
[tex]z-score for 22 points = (22 - 20.2) / 25 = 0.072[/tex]
Using a z-table or a calculator with a normal distribution function, we can find the percentage of games with a z-score greater than or equal to 0.072, which is approximately 53.10%. To find how many games this represents, we can multiply this percentage by the total number of games:
[tex]0.5310 x 32 = 17 games[/tex]
Therefore, Tim would have scored 22 points or more in approximately 17 games out of 32.
e. To find how many games Tim would have scored within 2.25 standard deviations from his average if he plays 32 games, we first need to calculate 2.25 standard deviations:
[tex]2.25 x 25 = 56.25[/tex]
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1. What is the breakeven point in unit sales and dollars for each type of filter at the current sales mix?
For fau/cet filter:
The break-even point in unit sales is 28,571 units.The break-even point in dollar is $2,571,390.For pitcher-filter:
The break-even point in unit sales is 22,222 units.The break-even point in dollar is $2,444,420.How do we calculate breakeven point in unit sales and dollars?Let's start with the fau/cet model:
Contribution margin per unit = selling price - variable cost
Contribution margin per unit = $90 - $25
Contribution margin per unit = $65
Contribution margin ratio = contribution margin per unit / selling price
Contribution margin ratio = $65 / $90
Contribution margin ratio = 0.722
The sales mix is 2 faucet models for every 3 pitcher filters sold, so the contribution margin weighted average is:
= (2/5)($65) + (3/5)($90-$20)
= $42
Now we can calculate the break-even point in units for the faucet model:
= Total fixed costs / contribution margin per unit
= $1,200,000 / $42
= 28,571 units
For pitcher filter:
Contribution margin per unit = selling price - variable cost
Contribution margin per unit = $110 - $20
Contribution margin per unit = $90
Contribution margin ratio = contribution margin per unit / selling price
= $90 / $110
Contribution margin ratio = 0.818
Contribution margin weighted average:
= (2/5)($25) + (3/5)($90-$20)
= $54
Break-even point in units for pitc/her filter:
= Total fixed costs / contribution margin per unit
= $1,200,000 / $54
= 22,222 units
Break-even point in dollars for fau/cet model:
= 28,571 units x $90 per unit
= $2,571,390
Break-even point in dollars for pitc/her-filter:
= 22,222 units x $110 per unit
= $2,444,420
Full question "Multiproduct CVP and decision making. Crystal Clear Products produces two types of water filters. One attaches to the faucet and cleans all water that passes through the faucet. The other is a pitcherfilter that only purifies water meant for drinking. The unit that attaches to the faucet is sold for $90 and has variable costs of $25. The pitcherfilter sells for $110 and has variable costs of $20. Crystal Clear sells two faucet models for every three pitchers sold. Fixed costs equal $1,200,000.
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Meredith drives 5 miles to the northeast, then 15 miles to the southeast, then 25 miles to the
southwest, then 35 miles to the northwest, and finally 20 miles to the northeast. How many miles is
Meredith from where she started?
Which answer choice gives the correct classification(s) of the number 1,256?
integer
natural, whole
integer, rational
natural, whole, integer, rational
Answer:
natural, whole, integer, rational
Step-by-step explanation:
Natural Number:
All the numbers in the set {1, 2, 3, …} are natural numbers, 1256 lies in this set.
Whole Number:
All the numbers in the set {0, 1, 2, 3, …} are whole numbers, 1256 lies in this set.
Integer:
All the numbers in the set {… ,-1, 0, 1, 2 …} are integers, 1256 lies in this set.
Rational Number:
1256 can be represented as [tex]\dfrac{1256}{1}[/tex] or [tex]\dfrac{2512}{2}[/tex] etc., which is in the rational form (division of two non zero integers). therefore 1256 is also a rational number.
Hopefully this answer helped you!!
=
For the cost and price functions below, find a) the number, q, of units that produces maximum profit; b) the price, p, per
unit that produces maximum profit; and c) the maximum profit, P.
C(q) = 70+ 15q; p=63-2q
a) The number, q, of units that produces maximum profit is q =
b) The price, p, per unit that produces maximum profit is p = $
c) The maximum profit is P = $
a) The number of units that produces maximum profit is q = 12.
b) The price per unit that produces maximum profit is p = $39.
c) The maximum profit is P = $386.
What is profit?
a) To find the number of units that produces maximum profit, we need to find the point where revenue equals cost. The revenue function is given by:
R(q) = pq = (63-2q)q = 63q - 2q²
The cost function is given by:
C(q) = 70 + 15q
The profit function is given by:
P(q) = R(q) - C(q) = (63q - 2q²) - (70 + 15q) = -2q² + 48q - 70
To find the number of units that produces maximum profit, we take the derivative of the profit function with respect to q, and set it equal to zero:
P'(q) = -4q + 48 = 0
Solving for q, we get:
q = 12
Therefore, the number of units that produces maximum profit is q = 12.
b) To find the price per unit that produces maximum profit, we substitute q = 12 into the price function:
p = 63 - 2q = 63 - 2(12) = 39
Therefore, the price per unit that produces maximum profit is p = $39.
c) To find the maximum profit, we substitute q = 12 and p = 39 into the profit function:
P = -2q² + 48q - 70 = -2(12)² + 48(12) - 70 = $386
Therefore, the maximum profit is P = $386.
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Please help me i need it for today!
1) The area of the garden in Design A and Design B is 108 [tex]feet^{2}[/tex]and 84[tex]feet^{2}[/tex]
2)The area of the deck not including the garden in Design A and Design B is 342 [tex]feet^{2}[/tex]and 372 [tex]feet^{2}[/tex]
3)The cost of $4.20 per [tex]feet^{2}[/tex]required to install the deck in Design A and Design B is $1890 and $1764 respectively
4) The cost of $1.40 per [tex]feet^{2}[/tex]required to install the garden in Design A and Design B is $151.2 and $117.6
5)Mr. and Mrs. Harper would like to choose Design A because its most affordable than Design A.
Therefore Mr. and Mrs. Harper save money $159.6.
How to calculate the money saved by Mr. and Mrs. Harper By choosing the affordable design?1) The area of the rectangular garden in design A
Area = length * width
From the fig, length = 9 feet
width = 12 feet
Area = 12 * 9 = 108 [tex]feet^{2}[/tex]
The area of the triangular garden in Design B
From the fig, Height = 12 feet
base = 14 feet
Therefore the area of the triangle = [tex]\frac{1}{2} * base *height\\\frac{1}{2} * 14 * 12[/tex]
= 84 [tex]feet^{2}[/tex]
2) The area of the rectangular deck is in design A
Area = length * width
= 18 * 25
= 450 [tex]feet^{2}[/tex]
The area of the rectangular deck is in design B
Area = length * width
= 21 * 20
= 420 [tex]feet^{2}[/tex]
The area of the rectangular deck without a rectangular garden in design A is =
= 450 - 108 = 342 [tex]feet^{2}[/tex]
The area of the rectangular deck without a triangular garden in design B is =
= 420 - 84[tex]feet^{2}[/tex] = 372 [tex]feet^{2}[/tex]
3) The cost of $4.20 per [tex]feet^{2}[/tex]required to install the deck in Design A and Design B
Therefore the total cost required to install the deck in design A
= 450 * 4.20
= $ 1890
Therefore the total cost required to install the deck in Design B
= 420 * 4.20
= $ 1764
4) The cost of $1.40 per [tex]feet^{2}[/tex]required to install the garden in Design A and Design B
Therefore the total cost required to install the garden in design A
= 108 * 1.40
= $ 151.2
Therefore the total cost required to install the garden in Design B
= 84 * 1.40
= $ 117.6
5) Mr. and Mrs. Harper would like to choose Design A because its most affordable than Design A.
Mr. and Mrs. Harper save money if they choose design B over design A
= (1890 + 151.2) - (1764 +117.6)
= 2041.2 - 1881.6
= $159.6
Therefore Mr. and Mrs. Harper save money $159.6.
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I need helppppppppp please help me
(1/64)^(2/3)
SOLVE LAW OF INDICES
Answer:
To solve this problem, we can use the laws of indices, specifically the law that states that (a^m)^n = a^(m*n).
So, we have:
(1/64)^(2/3) = (1^(2/3))/(64^(2/3))
Since any number raised to the power of 1 is itself, we can simplify the numerator to just 1.
Now, we have:
(1/64)^(2/3) = 1/(64^(2/3))
To evaluate 64^(2/3), we can use the law of indices again, which states that a^(1/n) = nth root of a. In this case, we have:
64^(2/3) = (64^(1/3))^2 = 4^2 = 16
So, substituting this back into the original expression, we have:
(1/64)^(2/3) = 1/16
Therefore, (1/64)^(2/3) simplifies to 1/16.
Step-by-step explanation:
Answer:
Using the law of indices, we have:
(1/64)^(2/3) = (1^(2/3))/(64^(2/3))
Now we need to simplify the denominator by finding the cube root of 64:
64^(1/3) = 4
Substituting this value in the original expression, we get:
(1/64)^(2/3) = (1^(2/3))/(4^2)
Simplifying further, we have:
(1/64)^(2/3) = 1/16
Step-by-step explanation:
When 60% of a number is added to the number 160, the result is .
Any percentage can be written as that number divided by 100. As a decimal, you find that quotient. You can quickly divide any number by 10 by moving the decimal place to the left for every 0 in that multiple of 10. 100 has 2 zeros, so all you need to do to divide by 100 is to move the decimal place 2 places to the left. Therefore, 60% is .6 as a decimal.
Let's say the number we want to find is x. In word problems, "of" indicates multiplication, so 60% of our number would be 6x.
We then add our number to that, giving us .6x + x
We know the result is 160, so
.6x + x = 160
Since any number multiplied by 1 is itself, that x can be written as 1x.
.6x + 1x = 160
Now, we combine our like terms; we add the numbers in front of the x's (aka coefficients).
(.6 + 1)x = 160
1.6x = 160
We want x by itself. 1.6 is multiplied by our number, so to undo multiplication, we do division. This leaves us with
x = 160/1.6
x=100
The mug is 5/8 full, the mug contains 3/4 of water find the capacity of the mug
The capacity of the mug is 1.2. The capacity of the mug can be found by using the equation C = (3/4) ÷ (5/8).
What is capacity?It is the maximum amount of output that can be produced in a given period of time. Capacity is usually expressed in terms of units per unit of time, such as gallons per minute or passengers per hour.
In this equation, 3/4 represents the amount of water in the mug, and 5/8 represents the amount the mug is full.
Let the capacity of the mug be x.
Given,
Mug is 5/8 full and contains 3/4 of water
So, 5/8 of the mug is filled with water
Therefore,
5/8 of x = 3/4
(5/8 )x = (3/4)
x = (3/4) × (8/5)
x = (24/20)
x = 1.2
Therefore, the capacity of the mug is 1.2.
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Pls help fast! Will get 20+ and brainliest
Answer:
a) 30 × .5 = 15 days
b) .2 + .1 = .3
Which best describes the relationship between the line that passes through the points (8, 2) and (3, 5) and the line that passes through the points (–3, –7) and (0, –12)?
A. parallel
B. same line
C. perpendicular
D. neither perpendicular nor parallel
The best line that represents the relation between the lines that passes through the points (8, 2) and (3, 5) and the line (-3, -7) and (0, -12) is a perpendicular line.
What are perpendicular lines?
In geometry, perpendicular lines are defined as two lines that meet or intersect each other at right angles (90 ∘). The term ‘perpendicular’ originated from the Latin word ‘perpendicularis,’ meaning a plumb line. If two lines AB and CD are perpendicular, then we can write them as AB ⊥ CD.
To determine the relationship between the two lines, we can first find the slope of each line using the two-point formula:
Slope of the line passing through (8, 2) and (3, 5):
m1 = (5 - 2) / (3 - 8) = -3/5
Slope of the line passing through (–3, –7) and (0, –12):
m2 = (-12 - (-7)) / (0 - (-3)) = -5/-3 = 5/3
If the two lines are parallel, their slopes will be equal. However, -3/5 is not equal to 5/3. If the two lines are perpendicular, their slopes will be negative reciprocals of each other. That is,
m1 x m2 = -1
But, (-3/5) x (5/3) = -1, which means that the two lines are perpendicular.
Therefore, the correct answer is C. perpendicular.
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Type the correct answer in each box. Use numerals instead of words. If necessary, use / for the fraction bar.
Consider figures 1 and 2 shown on the coordinate plane. Figure 1 has been transformed to produce figure 2.
This transformation of figure 1 has been transformed to produce figure 2, can be described by (x' , y') = (x' -y')
What is transformation in geometry?Transformation describes how an item moves, particularly as they are shown on a coordinate plane.
There are four possible transformations of a point, line, or geometric figure, each of which changes the object's shape and/or position. The four methods comprise
rotationdilationreflectiontranslationPre-Image refers to the item's shape before transformation, whereas Image refers to the object's ultimate location and shape.
The linked image's preimage and image may be examined to determine that reflection is the involved translation.
The transformation rule for reflection over the y-axis is as follows:
(x, y) → (x, -y)
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15. Mathew waxes a car twice as fast as Andrea. If Andrea takes 24 minutes to wax the car, how much
time will they take together to wax the same car?
A) 8 minutes
B) 18 minutes
C) 12 minutes D) 16 minutes
E) 10 minutes
According to the solving time will they take together to wax the same car 16 minutes
Define minutes?The minute is a unit of time usually equal to 160 (the first sexagesimal fraction) of an hour, or 60 seconds.
According to the given information:Let's assume that Andrea takes x minutes to wax the car. Then Mathew takes x/2 minutes to wax the same car since he waxes twice as fast as Andrea.
We know that Andrea takes 24 minutes to wax the car. So we can substitute this value in the equation and solve for x.
x = 24 * 2 = 48
So Andrea takes 48 minutes to wax the car alone.
Now we can use the formula:
1/x + 1/(x/2) = 1/t
where t is the time taken by both of them together to wax the same car.
Substituting x = 48, we get:
1/48 + 1/24 = 1/t
Solving for t, we get:
t = 16minutes
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write an inequality for x
1383400691
Find the experimental probability that 3 of 4
children in a family are boys.
The problem has been simulated by tossing 4
coins (one to represent each child). Let "heads"
represent a boy and "tails" represent a girl. A
sample of 20 coin tosses is shown.
HTHH HTTH TTTT THTT HTHT
HHTT HHHT THHT HTTH TTHH
HTTT HTHT TTHH THTH HTHH
TTHT HTTT HTHT HHHT HHHH
Experimental Probability
The volume of a cuboid is 108cm3.
The length is 4cm and the width is 9cm.
Work out the height of the cuboid.
Answer:
You can use the formula for the volume of a cuboid, which is Volume = length x width x height
You are given the volume of the cuboid as 108cm^3, the length as 4cm, and the width as 9cm. Let's substitute these values into the formula and solve for the height:
108cm^3 = 4cm x 9cm x height
To solve for height, you can divide both sides by 36 (which is equal to 4cm x 9cm) to isolate height:
108cm^3 ÷ 36 = 4cm x 9cm x height ÷ 36
3cm = height
So the height of the cuboid is 3cm.
F.BF.1b Combine standard function types using arithmetic o
Give the equation for f(x) + g(x) given that
f(x) = x² - x + 1 and g(x) = 2x + 3
We can easily say that the following about this question:
Functions are polynomial expressions.Arithmetic operations are performed between coefficients of terms of the same degree. Coefficients of different degrees are written as they are, without being changed.[tex]f(x)=x^2-x+1[/tex] and [tex]g(x)=2x+3[/tex] can be combined as;
[tex]f(x)+g(x)=x^2+(2-1)x+(3+1)[/tex][tex]f(x)+g(x)=x^2+x+4[/tex]5. A deli bought 45kg of tuna salad R1.48 per kg. In warm weather about 5kg usually spoil before they can be sold. What price per kg will give the desired profit of 40% of selling price?
The deli needs to sell the tuna salad at a price of R2.33 per kg to achieve a profit of 40% of the selling price after 5kg spoilage.
What price per kg will give the desired profit of 40% of selling price?A desired profit also known as target profit means expected amount of profit that the managers of a business expect to achieve by the end of a designated accounting period.
First, let's calculate the cost of the tuna salad the deli purchased:
= 45kg x R1.48/kg
= R66.60
How much tuna salad the deli has left after spoilage:
= 45kg - 5kg
= 40kg
To achieve a profit of 40% of the selling price, the selling price should be 140% of the cost price: which is:
= 140% of cost price
= 1.4 x R66.60
= R93.24
To find the price per kilogram, we divide the selling price by the remaining amount of tuna salad:
= Selling price / Remaining amount of tuna salad
= R93.24 / 40kg
= R2.33/kg
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Answer: 6 dolla per kg
Step-by-step explanation:
What is 55 increased by 10%
Answer:
60.5
Step-by-step explanation:
Answer: 60.50
Step-by-step explanation:
.
DRAW THE TWO GRAPHS OF Y=+X^3 AND Y=-X^3 OF THE SAME AXEL SYSTEM
The blue curve represents y = x³ and the red curve represents y = -x³.in the attached image.
What are the quadrants?
The quadrant refers to one of the four regions in a two-dimensional coordinate system, formed by two perpendicular lines that intersect at their common origin, or point of intersection.
a graph of y = x³ and y = -x³ on the same axes:
We can see the graph of equations y = x³ and y = -x³ in the attached image.
The blue curve represents y = x³ and the red curve represents y = -x³.
They are symmetric about the origin, and the blue curve is in the first and third quadrants while the red curve is in the second and fourth quadrants.
Hence, The blue curve represents y = x³ and the red curve represents y = -x³.in the attached image.
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3/2 (as a fraction) by the power of 4
Answer:
5.0625
Step-by-step explanation:because it is 1.5 as a decimel and that to the power of 4 is 5.0625
Answer:
1.97
Step-by-step explanation:
(3/2)^4
3^4 / 2^4
81/16
Find the value of V.
From the diagram the value of v is √6
How to solve for the value of v?You should recall that Trigonometry is a branch of mathematics concerned with relationships between angles and ratios of lengths.
Using the trigonometrical ratios, we have
Tangent = opposite /adjacent
This implies that
√2/1 = 2√3/v
cross and multiplying to have
v√2 = 2√3
Rationalizing the denominator and making v the subject of the formular we have
v = 2√3/√2 *√2/√2
v = 2√2/2
Therefore the value of v is √6
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Functions for -4,-6,-9,-27/2,-81/2
The function of the sequence -4,-6,-9,-27/2,-81/2 is f(n) = -4(3/2)^(n - 1)
Identifying the function of the sequence
from the question, we have the following parameters that can be used in our computation:
-4,-6,-9,-27/2,-81/2
The above sequence is a geometric sequence
This is because it has a common ratio calculated as
r = -6/-4
So, we have
r = 3/2
The sequence is then represented as
f(n) = ar^n-1
So, we have
f(n) = -4(3/2)^(n - 1)
Hence, the function is f(n) = -4(3/2)^(n - 1)
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