The vector components and direction of the river and motorboat are;
(a) 12·i
(b) 12·i + 12·√3·j
(c) 24·i + 12·√3·j
(d) 31.7 mi/h
The direction of the motorboat is N 49.1° EWhat is a vector?A vector is a quantity or measurement that indicates a magnitude and a direction of the measurement.
The direction the river flows = East
The speed of the river = 12 mi/h
The direction the boater heads = 60° from the shore
Speed of the motor boar = 24 mi/h
The unit vector in the east direction = i
Unit vector in the north direction = j
(a) The velocity of the river, which is 12 mi/h east expressed in vector form is therefore;
12·i(b) The velocity of the motorboat relative to the river, in vector component form is therefore;
Component of the velocity in the east direction = 24 × cos(60°)·i = 12·i
Component in the north direction = 24 × sin(60°)·j = 12·√3·j
The component form of the velocity of the boat is therefore;
[tex]\vec{v}[/tex] = 12·i + 12·√3·j(c) The true velocity of the boat is the vector sum of the velocity of the river and the velocity of the boat, therefore;
True velocity of the boat = 12·i + 12·i + 12·√3·j = 24·i + 12·√3·j
True velocity of the boat = 24·i + 12·√3·j(d) The true speed is the magnitude of the velocity of the boat which can be found ads follows;
[tex]| \vec{v}|[/tex] = √(24² + (12·√3)²) ≈ 31.7The (true) direction of the motorboat, θ, can be obtained from the arctangent of the ratio of the velocity component in the northern direction to the velocity in the eastern direction as follows;
The velocity component of the motorboat in the northern direction = 12·√3
The component of the velocity in the eastern direction = 24
Therefore;
tan(θ) = 12·√3/(24)
θ = arctan(12*√3/(24)) ≈ 40.9°, which is about East 40.9° North
The direction from the north, therefore is found as follows;
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the measure of angle abd is (0.12x + 67) deg and the measure of angle cbd is (0.13x + 26) deg find the value of x.
Therefore, the value of x is 348 the measure of angle ABD is (0.12x + 67) deg and the measure of angle CBD is (0.13x + 26).
What is angle?An angle is a geometric figure formed by two rays, called the sides of the angle, that share a common endpoint, called the vertex of the angle. Angles are measured in degrees (°) or radians (rad) and are typically denoted by the vertex letter. The size of an angle is determined by the amount of rotation needed to rotate one of the sides of the angle onto the other side. An angle of 90 degrees is called a right angle, an angle less than 90 degrees is called an acute angle, and an angle greater than 90 degrees but less than 180 degrees is called an obtuse angle. Angles are used in a variety of fields, including geometry, trigonometry, and physics, and play an important role in understanding the properties and relationships of shapes and objects.
Here,
Since angles ABD and CBD are adjacent and share side BD, their measures must add up to 180 degrees (since they form a straight line). Therefore, we can write the following equation:
ABD + CBD = 180
Substituting the given measures of angles ABD and CBD, we get:
(0.12x + 67) + (0.13x + 26) = 180
Simplifying the left side of the equation by combining like terms, we get:
0.12x + 0.13x + 67 + 26 = 180
0.25x + 93 = 180
Subtracting 93 from both sides of the equation, we get:
0.25x = 87
Dividing both sides of the equation by 0.25, we get:
x = 348
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Two concentric circles have radii of 14 and 16. Find the area of the ring. Round to the nearest tenth.
The area of the ring formed by concentric circles is approximately 188.5 square units.
What is area?
An object's area is how much space it takes up in two dimensions. It is the measurement of the quantity of unit squares that completely cover the surface of a closed figure.
The ring is formed by two concentric circles.
The area of the ring can be found by subtracting the area of the smaller circle from the area of the larger circle.
The area of a circle with radius r is given by the formula A = πr².
So, the area of the larger circle with radius 16 is -
A1 = π(16)² = 256π
And the area of the smaller circle with radius 14 is -
A2 = π(14)² = 196π
Therefore, the area of the ring is -
A ring = A1 - A2
A ring = 256π - 196π
A ring = 60π
To round to the nearest tenth, we can approximate π as 3.14 -
A ring ≈ 60 × 3.14 = 188.4
Rounding to the nearest tenth, we get -
A ring ≈ 188.4 ≈ 188.5
Therefore, the area of the ring is 188.5 square units.
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During her trip kaitlyn's calls to the United States total 100 minutes.What will be the total cost for these calls explain.
The total cost of Kaitlyn's calls to the United States depends on the rate charged by her service provider, and it is important to be aware of any additional fees or charges that may apply.
The total cost of Kaitlyn's calls to the United States depends on the rate charged by her service provider. If Kaitlyn has a plan with a specific rate for international calls, her total cost can be calculated by multiplying the number of minutes by the rate. For example, if her plan charges $0.10 per minute, then 100 minutes of calls would cost $10. However, if Kaitlyn does not have a plan that includes international calls, the cost per minute may be significantly higher, and there may be additional fees or charges. Therefore, it is important to check with the service provider for specific rates and fees before making international calls. It may be beneficial for Kaitlyn to consider purchasing an international calling plan or using a calling app to minimize costs. Overall, the total cost for Kaitlyn's calls to the United States will depend on the specific rate charged by her service provider, and it is important to be aware of any additional fees or charges that may apply.
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1.Amy invested £200 into a bank account with 10% simple interest per year. How much money will she have in her account after 2 years?
Answer:
Amy will have £240 in her account.
Step-by-step explanation:
To calculate the amount of money Amy will have in her account after 2 years, we can use the formula:
A = P(1 + rt)
Where:
A = the total amount of money in the account after 2 years
P = the principal (the initial amount of money invested)
r = the interest rate (as a decimal)
t = the time in years
In this case, Amy invested £200 at an interest rate of 10% per year for 2 years. We can plug in these values into the formula and solve for A:
A = 200(1 + 0.1 × 2)
A = 200(1.2)
A = £240
Therefore, after 2 years, Amy will have £240 in her account.
A path is 288.3 feet long. Jamie wants to walk the length of the path taking 100 equal steps. How long should each step be? A. 0.2883 foot B. 2.883 feet C. 28.83 feet D. 288.3 feet
Answer:
B) 2.883
Step-by-step explanation:
288.3/100=2.883
Check
2.883x100= 288.3
Find the component if the Vector BC if B=(2,-7) and C= (-4,-5)
The component of vector BC in the direction of the x-axis is (-6, 0).
What is the component of the vector on x-axis?
To find the component of vector BC, we need to find the projection of vector BC onto a given vector.
The component of vector BC in the direction of the x-axis can be found using the formula:
comp(x) = (BC · unit(x)) · unit(x)
where;
BC is the vector from B to C, unit(x) is the unit vector in the direction of the x-axis, and comp(x) is the component of vector BC in the direction of the x-axis.To find unit(x), we can use the following formula:
unit(x) = (1, 0)
since the x-axis is the horizontal axis and its unit vector has a horizontal component of 1 and a vertical component of 0.
Now, let's calculate the component of vector BC in the direction of the x-axis:
BC = C - B = (-4, -5) - (2, -7) = (-6, 2)
|BC| = √((-6)² + 2²)
|BC| = √(40)
unit(x) = (1, 0)
(BC · unit(x)) = (-6) · 1 + (2) · 0 = -6
comp(x) = (BC · unit(x)) · unit(x) = (-6) · (1, 0) = (-6, 0)
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The complete question is below:
Find the component of the Vector BC on x-axis, if B=(2,-7) and C= (-4,-5)
[9-A] Let f: R→→R be defined by the formula
The values οf a and b that make the functiοn f cοntinuοus at x = -2 and x = 3 are a = -2 and b = 1
Describe Functiοn?A functiοn is said tο be cοntinuοus if it has nο jumps, breaks, οr hοles in its graph. In οther wοrds, a functiοn is cοntinuοus if it can be drawn withοut lifting the pen frοm the paper. Fοrmally, a functiοn is cοntinuοus at a pοint x = c if the limit οf the functiοn as x apprοaches c frοm bοth the left and the right exists and is equal tο the value οf the functiοn at c.
Fοr example, the functiοn f(x) = x² is cοntinuοus everywhere because it is a smοοth curve with nο jumps οr breaks in its graph. On the οther hand, the functiοn g(x) = 1/x is cοntinuοus everywhere except at x = 0, where it has a vertical asymptοte and a hοle in its graph.
The cοncept οf cοntinuity is impοrtant in many areas οf mathematics, including calculus and analysis, as it allοws us tο study the behaviοr οf functiοns at specific pοints and οver intervals. It is alsο impοrtant in real-wοrld applicatiοns, such as in engineering and physics, where cοntinuοus functiοns mοdel physical phenοmena like mοtiοn, heat transfer, and fluid flοw.
Tο find the values οf a and b, we can use the cοntinuity οf the functiοn at x = -2 and x = 3. Fοr a functiοn tο be cοntinuοus at a pοint, it must exist at that pοint and its limit as x apprοaches that pοint frοm bοth sides must be equal.
At x = -2:
The left-hand limit οf f(x) as x apprοaches -2 is f(-2-) = 2(-2)² - 3 = 5.
The right-hand limit οf f(x) as x apprοaches -2 is f(-2+) = a(-2) + b.
Since the functiοn is cοntinuοus at x = -2, these limits must be equal:
f(-2-) = f(-2+) => 5 = -2a + b
At x = 3:
The left-hand limit οf f(x) as x apprοaches 3 is f(3-) = a(3) + b.
The right-hand limit οf f(x) as x apprοaches 3 is f(3+) = (6/3) - 3 = -1.
Since the functiοn is cοntinuοus at x = 3, these limits must be equal:
f(3-) = f(3+) => a(3) + b = -1
We nοw have twο equatiοns with twο unknοwns:
5 = -2a + b
a(3) + b = -1
Sοlving fοr b in terms οf a in the first equatiοn gives:
b = 2a + 5
Substituting this expressiοn fοr b intο the secοnd equatiοn gives:
a(3) + 2a + 5 = -1
3a + 5 = -1
3a = -6
a = -2
Substituting this value οf a intο the first equatiοn gives:
5 = -2(-2) + b
5 = 4 + b
b = 1
Therefοre, the values οf a and b that make the functiοn f cοntinuοus at x = -2 and x = 3 are a = -2 and b = 1.
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Given the functions f(x)= 1/x-3 -1 and g(x)= 1/x+4-3. Which statement describes the transformation of the graph of the function f onto the graph of the function g.
For the functions f(x)= 1/x-3 -1 and g(x)= 1/x+4-3, the transformation of the graph shows that The graph shifts 7 units left and 2 units down.
What is the definition of a function?
In mathematics, a function is a rule or relationship between two sets of values, known as the domain and the range, that assigns to each element in the domain a unique element in the range.
More formally, a function f is a set of ordered pairs (x, y), where x is an element of the domain and y is an element of the range, such that each element in the domain is paired with exactly one element in the range. This can be written symbolically as:
f: X → Y
where X is the domain and Y is the range, and the arrow → indicates that each element in X is mapped to a unique element in Y.
Now,
To understand the transformation of the graph of the function f onto the graph of the function g, we need to analyze the effect of the changes in the functions.
First, let's consider the function f(x) = 1/(x-3) - 1. This function is a rational function with a vertical asymptote at x = 3 and a horizontal asymptote at y = -1. It is also reflected about the x-axis compared to the basic reciprocal function 1/x.
Next, let's consider the function g(x) = 1/(x+4) - 3. This function is also a rational function with a vertical asymptote at x = -4 and a horizontal asymptote at y = -3. It is also reflected about the x-axis compared to the basic reciprocal function 1/x.
To determine the transformation from f(x) to g(x), we need to compare the changes in the two functions. We can see that:
The term (x-3) in f(x) has been replaced with (x+4) in g(x), which indicates a horizontal shift of 7 units to the left.
The term -1 in f(x) has been replaced with -3 in g(x), which indicates a vertical shift of 2 units down.
Therefore,
the graph of the function f has been shifted 7 units to the left and 2 units down to obtain the graph of the function g. So, the correct statement is:
The graph shifts 7 units left and 2 units down.
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Right Question:-Given the functions f(x)= 1/x-3 -1 and g(x)= 1/x+4-3. Which statement describes the transformation of the graph of the function f onto the graph of the function g.
The graph shifts 2 units left and 7 units up.
The graph shifts 2 units right and 7 units down.
The graph shifts 7 units left and 2 units up.
The graph shifts 7 units right and 2 units down.
is y= |x| + 4 a relation or function
The answer you're probably wanting is "function," since it is a function.
Technically though, it's both. A function is a relation, one where each x-value (or input) has exactly one y-value (or output). So every function is a relation, but not every relation is a function.
In a popular shopping centre, the waiting time for an ABC Bank ATM machine is found to be uniformly distributed between 1 and 5 minutes. What is the probability of waiting between 2 and 4 minutes to use the ATM?
The probability of waiting between 2 and 4 minutes to use the ATM is 0. 5 or 50 %.
How to find the probability ?For a uniform distribution, the probability density function is constant within the given interval. In this case, the interval is between 1 and 5 minutes. The length of the interval is 5 - 1 = 4 minutes.
Now, we want to find the probability of waiting between 2 and 4 minutes. The length of this subinterval is 4 - 2 = 2 minutes. To find the probability of waiting between 2 and 4 minutes, we multiply the probability density by the length of the subinterval:
Probability = probability density × (length of subinterval) = (1/4) × 2 = 1/2 = 0.5
So, the probability of waiting between 2 and 4 minutes to use the ATM is 0.5 or 50%.
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Draw and shade in a separate venn diagram representing
BIA
According to the information, the Venn diagram that relates the image data would look like this (image attached).
What is a Venn diagram?A Venn diagram is a term that refers to a type of graph that is used to graph similarities, differences, and relationships between sets, ideas, categories, among others. The sales diagram is made up of interlocking circles in which the data is classified.
To draw this Venn diagram we have the following data:
U: 3, 4, 5, 6, 7, 8, 9, 10, 11, 12.A: 4, 6, 8, 10, 12.B. 9, 10, 11, 12.Since we must draw the separate Venn diagram, we must make three circles and classify the data accordingly as shown in the image.
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Please help me answer this math question
The expression for the area of the floor q⁴r⁶
The error in the expression is that the square of the exponent of r was given in place of the product.
How to determine the errorIt is important to note that index forms are defined as models that are used to write or express conveniently, numbers that are too large or small.
Index forms are also called standard forms or scientific notations.
Some rules of index forms are;
Add the values of the exponents when two numbers of same bases re being multipliedSubtract the values of the exponents when two numbers of same bases are being dividedWhen expanding the parentheses, multiply the exponents.From the information given, we have that;
(q²r³)²
expand the bracket, we get;
q⁴r⁶
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For the right triangles below, find the exact values of the side lengths d and c. If necessary, write your responses in simplified radical form.
[tex]d = 5\sqrt{3}[/tex]
[tex]e = 2\sqrt{2}[/tex]
If h(x) = √6 + 5f(x), where f(2)= 6 and f'(2) = 5, find h'(2).
Using chain rule to find the derivative of h(x), the value of h'(2) is 25
What is the value of the functionThe chain rule is a rule in calculus that allows us to find the derivative of a composite function. A composite function is a function that is composed of two or more functions. For example, if we have two functions f(x) and g(x), then the composite function, denoted by h(x), would be h(x) = f(g(x)).
Using the chain rule, we can find the derivative of h(x) with respect to x as follows:
h(x) = √6 + 5f(x)
h'(x) = d/dx (√6 + 5f(x))
h'(x) = d/dx (√6) + d/dx (5f(x))
h'(x) = 0 + 5f'(x)
Now, to find h'(2), we substitute x=2 in the expression above and use the given value of f'(2):
h'(2) = 5f'(2)
h'(2) = 5(5)
h'(2) = 25
Therefore, h'(2) = 25.
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Angles a and c are considered what type of angles
A)Supplementary
B)vertical
C)corresponding
D) adjacent
Find the area and perimeter
Answer:
Area = 6a^4Perimeter = 12a^2
Step-by-step explanation:
from the measurements and from the figure it is a right triangle (triple of Pythagoras 3-4-5)
Area = 1/2 b × h
Area = 1/2 3a² × 4a²
Area = 1/2 [tex]12a^{4}[/tex]
Area = [tex]6a^{4}[/tex]
----------------------------------
Perimeter
find the hypotenuse
by the rule of Pythagorean triples it is 5a²
so
3a² + 4a² + 5a² =
12a² (perimeter)
This is the bone density score separating the bottom, 7% from the top 93%
This means that bone density scores below -1.88 are in the bottom 7% of scores, and scores above 1.88 are in the top 93% of scores.
What is Algebraic expression ?
Algebraic expression can be defined as combination of variables and constants.
It is relates to bone density score distribution, where the bottom 7% of scores are separated from the top 93% of scores. This could be interpreted in a few different ways, but here's one way to approach it:
If we assume that the bone density scores are normally distributed (which is a common assumption in statistics), then we can use the properties of the normal distribution to estimate the cutoff values for the bottom 7% and top 93% of scores.
The standard normal distribution has a mean of 0 and a standard deviation of 1. Using this distribution, we can look up the cutoff values for the bottom 7% and top 93% of scores using a standard normal distribution table or calculator. These cutoff values represent the bone density scores below which 7% of scores fall and above which 93% of scores fall.
For example, using a standard normal distribution table, we can find that the cutoff value for the bottom 7% of scores is approximately -1.88, and the cutoff value for the top 93% of scores is approximately 1.88.
Therefore, This means that bone density scores below -1.88 are in the bottom 7% of scores, and scores above 1.88 are in the top 93% of scores.
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Use the graph to answer the question
Determine the line of reflection
Reflection across the X-axis
Reflection across the x = 4
Reflection across the y = -5
Reflection across the y-axis
When thinking about lines of reflection, imagine that there exists a mirror and your trying to guess the location of the mirror on the xy plane. It will have to be located on horizontal line where y is -5. So your line of reflection is y = -5.
Solve. 9²x 3⁵ = [?]
Solving and simplifying the potenciation, we get 3⁹
Potentiation simplificationAs the bases presented are multiple, we can reduce it to the common base 3.
To do this, replace 9 with the equivalent in base 3.
That is, 3².
Then, apply the property of multiplying like bases, adding the exponents.
[tex]\begin{array}{l}\sf 9^{2} \times 3^{5}=[?]\\\raisebox{4pt}{$\sf \big(3^{2}\big)^{\!2} \times 3^{5}=[?]$}\\\sf 3^{4} \times 3^{5}=[?]\\\sf 3^{4+9} = [?]\\\sf 9^{2} \times 3^{5} = 3^{9}\end{array}[/tex]
So, the result found is 3⁹
Alternatively, the result can be written as 1.9683×10⁴, in scientific notation
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Solce the system
y=-1/6x+5
x+6y=30
Answer: X = 1, Y = 29
Step-by-step explanation:
X + 6(-1/6X + 5) = 30
X - 1 +30 = 30
X + 29 = 30
X = 1
Y = -1/6*1 + (5/1)*6
Y = -1/6 + 30/6
Y = -1 + 30
Y = 29
A 16 foot ladder is propped up against the roof of a house. The angle of elevation is 62 degrees. How tall is the house?
Answer is below.
Let's call the height of the house "h".
The ladder is propped up against the house, forming a right triangle with the wall of the house and the ground. The ladder is the hypotenuse of the triangle, and the height of the house is one of the legs.
We know that the length of the ladder is 16 feet, and the angle of elevation is 62 degrees. We can use trigonometry to find the height of the house.
The trigonometric function that relates the angle of elevation to the height and length of the ladder is the tangent function:
tan(62) = h/16
To solve for h, we can multiply both sides by 16:
16 tan(62) = h
Using a calculator, we can evaluate the tangent of 62 degrees to get:
16 tan(62) ≈ 28.6
So the height of the house is approximately 28.6 feet.
What is the total amount in Naira that Musa will pay the bank if the commission charged by the bank is 34Naira on each bank draft and he buys a bank draft of (a) $427 (b) £335 (take the exchange rate to be $1=2Naira, £1=15Naira)
Answer:
(a) Musa wants to buy a bank draft for $427. Since $1 = 2 Naira, the cost of the bank draft in Naira will be:
$427 x 2 Naira/$1 = 854 Naira
The commission charged by the bank is 34 Naira on each bank draft, so the total amount in Naira that Musa will pay the bank will be:
854 Naira + 34 Naira = 888 Naira
Therefore, Musa will pay the bank a total of 888 Naira for the bank draft.
(b) Musa wants to buy a bank draft for £335. Since £1 = 15 Naira, the cost of the bank draft in Naira will be:
£335 x 15 Naira/£1 = 5,025 Naira
The commission charged by the bank is 34 Naira on each bank draft, so the total amount in Naira that Musa will pay the bank will be:
5,025 Naira + 34 Naira = 5,059 Naira
Therefore, Musa will pay the bank a total of 5,059 Naira for the bank draft.
a) Musa will pay the bank a total of ₦49,106 (42,700 + 6,406) if he buys a bank draft of $427. The conversion rate is $1 = ₦2 and the charges amount to 34 × 427 = 14,358, so the total amount to be paid is 42,700 + 14,358 = 56,058. Subtracting the commission, the total amount is 56,058 - 6,406 = 49,102.
b) Musa will pay the bank a total of ₦68,030 (50,500 + 17,530) if he buys a bank draft of £335. The conversion rate is £1 = ₦15 and the charges amount to 34 × 335 = 11,290, so the total amount to be paid is 50,500 + 11,290 = 61,790. Subtracting the commission, the total amount is 61,790 - 17,530 = 68,030.
Every MAC address is made up of 6 sets of 2-digit hexadecimal numbers. Here's an example: D5-BE-E9-8D-44-9C What's the maximum number of devices that can have unique MAC addresses?
The maximum number of devices that can have unique MAC addresses is given as follows:
16^12 = 2.81 x 10^14.
What is the Fundamental Counting Theorem?The Fundamental Counting Theorem states that if there are m ways to do one thing and n ways to do another, then there are m x n ways to do both. This can be extended to more than two events, where the number of ways to do all the events is the product of the number of ways to do each individual event.
There are 16 hexadecimal digits, from 0 to 9 and then A to E, hence we have 12 digits, each with 16 possible numbers.
Then the total number of unique sequences is given as follows:
16^12 = 2.81 x 10^14.
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What is y = -4x + 11 , 3x + y =9
Please help me asap!
Step-by-step explanation:
the original price was $225.
that is the 100% we are basing on.
the new price is $340.
the difference is 340 - 225 = $115
to know the % increase we need to calculate how many % of the original 100% are these $115.
1% = 100%/100 = 225/100 = $2.25
$115 are as many % as 1% fits into it :
115 / 2.25 = 51.11111111...% ≈ 51%
if we need to include the additional $50 bags fee, then the price difference is not $115 but $165.
165/2.25 = 73.33333333...% ≈ 73%
the percent increase of the ticket is about 51%.
the percent increase with the baggage fee is about 73%.
Zoe Corporation has the following information for the month of March:
Cost of direct materials used in production
Direct labor
Factory overhead
Work in process inventory, March 1
Work in process inventory, March 31
Finished goods inventory, March 1
Finished goods inventory, March 31
a. Determine the cost of goods manufactured.
b. Determine the cost of goods sold.
$18,435
26,510
37,267
15,183
21,746
21,407.
26,154
Answer:
Step-by-step explanation:
To determine the cost of goods manufactured, we need to add up the total manufacturing costs incurred during the month and subtract the cost of work in process inventory on March 1, then add the cost of work in process inventory on March 31:
Total Manufacturing Costs = Cost of Direct Materials Used + Direct Labor + Factory Overhead
Total Manufacturing Costs = $18,435 + $26,510 + $37,267
Total Manufacturing Costs = $82,212
Cost of Goods Manufactured = Total Manufacturing Costs - Work in Process Inventory, March 1 + Work in Process Inventory, March 31
Cost of Goods Manufactured = $82,212 - $15,183 + $21,746
Cost of Goods Manufactured = $88,775
Therefore, the cost of goods manufactured for the month of March is $88,775.
To determine the cost of goods sold, we need to calculate the cost of goods available for sale, which is the sum of the cost of goods manufactured and the cost of finished goods inventory on March 1, and then subtract the cost of finished goods inventory on March 31:
Cost of Goods Available for Sale = Cost of Goods Manufactured + Finished Goods Inventory, March 1
Cost of Goods Available for Sale = $88,775 + $21,407
Cost of Goods Available for Sale = $110,182
Cost of Goods Sold = Cost of Goods Available for Sale - Finished Goods Inventory, March 31
Cost of Goods Sold = $110,182 - $26,154
Cost of Goods Sold = $84,028
Therefore, the cost of goods sold for the month of March is $84,028.
In an arithmetic sequence, the sum of the first 8 terms is 88. The product of the 1st and the 8th terms is 120. Calculate values for the 1st term.
Answer: Let's call the first term of the arithmetic sequence "a", and the common difference between the terms "d".
Then, we know that the sum of the first 8 terms is 88, so we can write:
a + (a + d) + (a + 2d) + ... + (a + 7d) = 88
Using the formula for the sum of an arithmetic sequence, we can simplify this to:
8a + 28d = 88
We also know that the product of the 1st and 8th terms is 120, so we can write:
a(a + 7d) = 120
Now we have two equations with two variables. We can solve for one of the variables in terms of the other and substitute into the other equation to solve for the remaining variable.
Solving the first equation for d:
d = (88 - 8a)/28
Substituting into the second equation:
a(a + 7[(88-8a)/28]) = 120
Multiplying both sides by 28 to eliminate the fraction:
28a^2 + 154a - 960 = 0
We can factor this quadratic equation as:
(2a - 15)(14a + 64) = 0
So either 2a - 15 = 0 or 14a + 64 = 0. Solving for "a" in each case, we get:
a = 15/2 or a = -64/14
Since we're looking for the first term of the sequence, which must be positive, we can discard the negative value and conclude that the first term is:
a = 15/2
Therefore, the first term of the arithmetic sequence is 7.5.
Step-by-step explanation:
the regular price of any souvenir at a gift shop is x dollars. During a sale today, if a customer purchases one souvenir at its regular price, the price of each additional souvenir will be 0.3x less than the regular price. if carmen purchases 10 souvenirs today, and x=$30, what does carmen pay
Answer:
If x = $30 is the regular price of a souvenir, then the sale price for each additional souvenir will be 0.3x = 0.3($30) = $9 less than the regular price. Therefore, the sale price of each additional souvenir will be:
Sale price = Regular price - $9
Sale price = $30 - $9
Sale price = $21
Since Carmen purchases 10 souvenirs, she pays the regular price for the first souvenir and the sale price for the remaining 9 souvenirs. Therefore, the total cost for all 10 souvenirs will be:
Total cost = (Regular price for first souvenir) + (Sale price for 9 additional souvenirs)
Total cost = ($30) + ($21 x 9)
Total cost = $30 + $189
Total cost = $219
Therefore, Carmen pays $219 for 10 souvenirs during the sale.
Step-by-step explanation:
can someone help me? please
3. a. A solution or feasible region, is the triangular region in the graph of the inequality, with vertices (0.7, -3.35), (8, -7), (8, -25.25)
Please find attached the graph of the feasible region of the inequality, created with MS Excel
b. The feasible region in the graph of the inequality indicates that the inequality remains true for the coordinates of points within the feasible region
What is an inequality?An inequality is an unequal comparison between values or expressions using inequality symbols such as <, >, ≤, and ≥.
3. The system of inequalities are presented as follows;
4·x + 8·y ≤ -24
-12·x - 4·y < 5
a. Making y the subject of the above inequalities, we get;
4·x + 8·y ≤ -24
y ≤ (-24 - 4·x) ÷ 8 = -3 - 0.5·x
y ≤ -3 - 0.5·x...(1)
-12·x - 4·y < 5
-4·y < 5 + 12·x
y > -1.25 - 3·x...(2)
The solution point is therefore;
-3 - 0.5·x = -1.25 - 3·x
2.5·x = 1.75
x = 1.75/2.5 = 0.7
The x-value of the solution point is therefore the point x = 0.7
y > -1.25 - 3 × 0.7 = -3.35
y > -3.35
The y-value of the solution point is the point y > -3.35
The solution point is therefore the point slightly to the right of the point (0.7, -3.35)
b. The solution space is the triangular region bounded by the points, (0.7, -3.35), (8, -7), and (8, -25.25)
A possible solution obtained from the graph is therefore, the point (6, -10), plugging in the values in the inequalities, we get;
When x = 6
y ≤ -3 - 0.5·x...(1)
y ≤ -3 - 0.5 × 6 = -6
The y-value at the point x = 6 is -10 ≤ -6, which satisfies the first inequality
The second inequality, indicates that we get;
y > -1.25 - 3·x
y > -1.25 - 3 × 6 = -19.25
The y-value at the selected point x = 6 is -10 > -19.25, which satisfies the second inequality
Therefore; The inequality is true at a specified point in the solution space as indicated from the graph
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1. Which type of function best represents the data shown in the table above?
Linear Quadratic Exponential
2. Decide which of the statements are true regarding the table above. 000 The first differences are constant. The ratio of the first difference to the second difference is constant. The second differences are constant.
3. Which type of function best represents the data shown in the table below? Linear Quadratic Exponential
I need urgent help please please please please D:
The type of function that best represents the data shown in the table above is Linear.
The statement that is true regarding the table above is that The first differences are constant.
The type of function that best represents the data shown in the table below is a Linear function.
What is a linear function?A linear function is a type of mathematical function that can be represented by a straight line on a graph. It has the form:
f(x) = mx + b
where "m" represents the slope of the line, and "b" represents the y-intercept, which is the point where the line crosses the y-axis.
In this case the linear function is exhibited.
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