The average velocity, to the nearest hundredth, of a ceiling tile that fell 43 feet is 344 feet per second
What is speed?Velocity is the pace and direction of an item's movement, whereas speed is the time rate at which an object is travelling along a route.
Given that the formula for the speed of a falling object is v= √64d,
where v is the speed of the object in feet per second and d is the distance the object has fallen, in feet.
And also given that d = 43 feet.
Substituting the value to the formula,
v = √64 (43)
v = 8 x 43
v = 344
Therefore, 344 feet per second is the velocity.
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help with this problem, I don't get it, I will give brainliest
The equation cos (π/6 + β) is solved to get
√3 / 2How to solve for the cosineFrom the question it was given that sine β = -0.8
solving for β
sine β = -0.8
β = arc sine ( -0.8 )
β = -0.9273
β ≈ -π/3
substituting the value into cos (π/6 + β)
cos (π/6 + β)
cos (π/6 - π/3)
cos (π/6 - π/3)
= √3 / 2
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Drag the numbers to complete the column two-way relative frequency table. Numbers may be used once, more than once, or not at all.
2829383949100
7th 8th Total
0–300 61%
% 50%
300+
% 62% 50%
Total
%
% 100%
Answer:
YOU L HAHA
Step-by-step explanation:
LOS ER
could you please help me find out how to add m+x
Answer:
i got u i have your email
Step-by-step explanation:
A line with a slope of 7 passes through the points (-7, 5) and (g, -2). What is the value of g?
g=
[tex](\stackrel{x_1}{-7}~,~\stackrel{y_1}{5})\qquad (\stackrel{x_2}{g}~,~\stackrel{y_2}{-2}) \\\\\\ \stackrel{slope}{m}\implies \cfrac{\stackrel{\textit{\large rise}} {\stackrel{y_2}{-2}-\stackrel{y1}{5}}}{\underset{\textit{\large run}} {\underset{x_2}{g}-\underset{x_1}{(-7)}}} ~~ = ~~\stackrel{\stackrel{\textit{\small slope}}{\downarrow }}{ 7 }\implies \cfrac{-7}{g+7}=7\implies -7=7(g+7) \\\\\\ \cfrac{-7}{7}=g+7\implies -1=g+7\implies \boxed{-8=g}[/tex]
For his birthday, Tyler's parents gave him $7,000.00 which they put into a savings account that earns 15% interest compounded quarterly. When Tyler started college, he withdrew the entire balance of $26,725.00 and used it to pay for tuition. How long was the money in the account?
The number of years the interest was compounded quarterly is given by the equation b = 9.098 years
What is Compound Interest?Compound interest is interest based on the initial principle plus all prior periods' accumulated interest. The power of compound interest is the ability to generate "interest on interest." Interest can be added at any time, from continuously to daily to annually.
The formula for calculating Compound Interest is
A = P ( 1 + r/n )ⁿᵇ
where A = Final Amount
P = Principal
r = rate of interest
n = number of times interest is applied
b = number of time periods elapsed
Given data ,
Let the amount after b years be A = $ 26,725.00
The number of years be = b
The number of times the interest is applies n = 4 ( quarterly )
Let the principal amount be P = $ 7,000
A = P ( 1 + r/n )ⁿᵇ
Substituting the values in the equation , we get
t = ln ( A/P ) / n [ ln ( 1 + r/n ) ]
t = b = n ( 26,725.00 / 7,000.00 ) / ( 4 × [ ln ( 1 + 0.15/4 ) ] )
On simplifying the equation , we get
b = ln ( 26,725.00 / 7,000.00 ) / ( 4 × [ ln ( 1 + 0.0375 ) ] )
b = ln ( 3.81785714 ) / 4 [ ln ( 1.0375 ) ]
On further simplification , we get
b = 9.098 years
Hence , the number of years the interest was applied is 9 years 1 months
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An auto maker is interested in information about how long transmissions last. A sample of transmissions are run constantly and the number of miles before the transmission fails is recorded. The auto maker claims that the transmissions can run constantly for over 150,000 miles before failure. The results of the sample are given below.
1) From Given output confidence level, is 95% level of significance = 1-0.95
10.05
How to calculate the value2) null hypothesis : M = 150000
=
3) Alternative hypothesis Ha: [M> 150000]
4) since P value = 0.033 is less than d=0.05 Reject null hypothesis.
5) There is sufficient evidence to conclude that the mean life of transmissions is over 1500 comity
6) 95% CI = â ± E
-1519±1.129
=(151.2-1.129, 151.2+1.129)
=(150.071, 152.329)
7) Since M=150 fall out side of the C. We Shoul retect null hypothesis.
8) The null hypothesis value fall outside of the Confidence Interval.
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Need help quick pls and thanks
a) The average rate of change is -0.6333.
b) For $500 after the inflation rate from 1917 to 1920 the worth will be 242.20631771406.
What is Rate of Change?The rate of change (ROC) measures how quickly a variable alters over a predetermined amount of time.
Given:
a) The average rate of change
= (15.9- 17.8)/ (1920 - 1917)
= -1.9 / 3
= -0.6333
So, the equation can be
y = -0.6333x + b
and, 17.8 = -0.63333(1917)+ b
b= 1231.79
So, y= -0.6333x + 1231.79
b) For $500 after the inflation rate from 1917 to 1920 the worth will be 242.20631771406.
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x = [ √(a+2) + √(a-2) ]/[ √(a+2) - √(a-2) ], then a =? the correct answer is a = x+(1/x). explain
how.
The inverse of the radical equation x = [√(a + 2) + √(a - 2)] / [√(a + 2) - √(a - 2)] is the equation a = x + 1 / x. (Correct choice: A)
How to clear a variable in a radical equation
In this problem we find the case of a radical equation in explicit form, that is, a variable x only in terms of a variable a, and we need to obtain the inverse of the function, that is, an expression in terms of a variable x. This problem can be solved by algebra properties.
First, write the original equation:
x = [√(a + 2) + √(a - 2)] / [√(a + 2) - √(a - 2)]
Second, rationalize the expression:
x = [[√(a + 2) + √(a - 2)] · [√(a + 2) + √(a - 2)]] / [[√(a + 2) - √(a - 2)] · [√(a + 2) + √(a - 2)]]
x = [√(a + 2) + √(a - 2)]² / [(a + 2) - (a - 2)]
x = [a + 2 - 2 ·√(a² - 4) + a - 2] / 4
x = [a - √(a² - 4)] / 2
2 · x = a - √(a² - 4)
Third, eliminate the square root operator by algebra properties:
√(a² - 4) = a - 2 · x
a² - 4 = (a - 2 · x)²
Fourth, find the solution to the expression:
a² - 4 = a² - 4 · x · a + 4 · x²
- 4 = - 4 · x · a + 4 · x²
1 = x · a - x²
1 + x² = x · a
a = (1 + x²) / x
a = 1 / x + x
a = x + 1 / x
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Support for character vector or string inputs will be removed in a future release. Instead, use syms to declare variables and replace inputs such as dsolve('Dy = -3*y') with syms y(t); dsolve(diff(y,t) == -3*y).
The support vector of the input dsolve('Dy = -3*y') is "dsolve(diff(y,t) == -3*y)".
A symbol is a mathematical object that represents a mathematical entity, such as a number, a variable, or a function. In mathematical software, symbols are used to represent variables, which can be used in mathematical expressions to perform computations.
In the past, character vectors or strings were used to represent symbols in certain mathematical software programs.
In the future release of this software, support for character vectors or strings will be removed. Instead, the program will require users to use the "syms" function to declare variables as symbols.
As an example of how this might be used in practice, consider the differential equation
=> "dy/dt = -3y".
In the past, this equation might have been entered into a mathematical software program using a character vector or string to represent the variable "y".
However, in the future release of this software, the user will need to use the "syms" function to declare "y" as a symbol. The equation would then be entered using the "diff" function, like this:
=> "dsolve(diff(y,t) == -3*y)".
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Find the volume of the solid obtained by rotating about the x-axis the region enclosed by the curves y = 16 /(x^2 + 16) , y = 0, x = 0, and x = 4.
The answer is supposed to come out to pi + (pi^2)/2.
The volume of the solid obtained by rotating about the x-axis the region enclosed by the curves is 32π/5 cubic units.
In this problem, we are asked to find the volume of a solid obtained by rotating a region enclosed by curves about the x-axis. We will use integration to calculate the volume.
First, let's sketch the region and the solid we need to find the volume of.
The region is enclosed by the curves
=> y = 16 /(x² + 16), y = 0, x = 0, and x = 4.
When we rotate this region about the x-axis, we get a solid with a hole in the center, shaped like a donut.
To find the volume of this solid, we can use the method of cylindrical shells.
We start by taking a thin strip of the region, parallel to the y-axis, and of width dy. This strip has height y, and we rotate it about the x-axis to get a cylindrical shell of thickness dy and radius x.
The volume of this cylindrical shell is given by the formula V = 2πxy dy, where x is the distance from the y-axis to the edge of the shell.
To express x in terms of y, we can solve for x in the equation
y = 16 /(x² + 16).
y(x² + 16) = 16
x² = 16/y - 16
x = √(16/y - 16)
Now we can substitute x into the formula for V to get:
V = 2πx(16/(x² + 16)) dy
[tex]= 2\pi(16/y - 16)^{1/2}(16/y) dy \\\\= 32\pi(y - y^{3/2}) dy[/tex]
To find the total volume, we integrate this expression from y = 0 to y = 1 (since the maximum value of y is 16/16 = 1):
[tex]\int_0^1 32\pi(y - y{(3/2)}) dy = 32\pi/5[/tex]
Therefore, the volume of the solid obtained by rotating the region about the x-axis is 32π/5 cubic units.
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Can anyone help me solve this? Thank you!
Your friend sings every Saturday night at your favorite bar in San Diego. During his show, people show up at the rate of 1 person every minute.
a) What is the probability that on a random minute, at least 3 people show up?
b) What is the probability that he will have to wait at least 3 minutes for the next person to show up?
c) If he has already waited for 1 minute for the next person to show up, what is the probability that he will have to wait at least 3 more minutes for the next person to show up?
Answer:
Step-by-step explanation:
a) The number of people showing up at the bar during any given minute is a Poisson process with an average rate of 1 person per minute. Let X be the number of people who show up during a random minute. Then X follows a Poisson distribution with parameter λ = 1. The probability of at least 3 people showing up in a random minute is:
P(X >= 3) = 1 - P(X < 3) = 1 - (P(X = 0) + P(X = 1) + P(X = 2))
We can use the Poisson probability mass function to find P(X = k) for k = 0, 1, 2:
P(X = k) = (e^-λ) * (λ^k) / k!
Plugging in λ = 1, we get:
P(X = 0) = e^-1 / 0! = 1/e
P(X = 1) = e^-1 * 1^1 / 1! = 1/e
P(X = 2) = e^-1 * 1^2 / 2! = 1/2e
So, the probability of at least 3 people showing up in a random minute is:
P(X >= 3) = 1 - (P(X = 0) + P(X = 1) + P(X = 2)) = 1 - (1/e + 1/e + 1/2e) = 1 - (2/e + 1/2e) = 1 - (5/2e)
b) The probability of having to wait at least 3 minutes for the next person to show up is equal to the probability of having 0, 1, or 2 people show up during the first three minutes. Using the same calculation as above, we find:
P(X <= 2) = P(X = 0) + P(X = 1) + P(X = 2) = (1/e) + (1/e) + (1/2e) = (2/e + 1/2e) = (5/2e)
So, the probability of having to wait at least 3 minutes for the next person to show up is 1 - (5/2e) = 1 - P(X <= 2).
c) If he has already waited for 1 minute, the probability of having to wait at least 3 more minutes for the next person to show up is equal to the probability of having 0 or 1 people show up during the next 2 minutes. Using the same calculation as above, we find:
P(X <= 1) = P(X = 0) + P(X = 1) = (1/e) + (1/e) = 2/e
So, the probability of having to wait at least 3 more minutes for the next person to show up is 1 - (2/e) = 1 - P(X <= 1).
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Task
You put two targets in the field. The coordinates for target 1 (6 Points)
The coordinates for target 2 (4 points). See the figure below.
Informe the coach
You asked the players to shoot the ball on the targets 4 times. You added that if
they hit one of the targets, they get the target points.
Test 1:
Messi shot the ball. His ball followed the path of the equation where x is the target
points:
3(3x-4)= 24
6.8 (2.3x + 5.7) = 132.6
Test 2:
Ronaldo shot the ball. His ball followed the path of the equation where y is the
target points.
2/3 (6y - 18) = -16.4. : 2 times
8.2 (x/2 - 5) = - 16.4. : 2 times
Answer:
Step-by-step explanation:
3/2*2/3(6y)=30*3/2
6y=45
6y/y=45/y
y=7.5
Set up two equations and solve.
9. The perimeter of a rectangle is 400 meters. The length is 20 meters longer than the
width. Find the length and width of the rectangle.
The width of rectangle = 90 m
And, The length of rectangle = 110 m
What is mean by Rectangle?
A rectangle is a two dimension figure with 4 sides, 4 corners and 4 right angles. The opposite sides of the rectangle are equal and parallel to each other.
Given that;
The perimeter of a rectangle is 400 meters.
And, The length is 20 meters longer than the width.
Now, Let the width of rectangle = x
Then, The length of rectangle = x + 20
We know that;
⇒ Perimeter of rectangle = 2 ( Length + width )
Substitute values ,
⇒ 400 = 2 (x + x + 20)
⇒ 400 = 2 (2x + 20)
⇒ 200 = 2x + 20
⇒ 2x = 200 - 20
⇒ 2x = 180
⇒ x = 90
Thus, The width of rectangle = x = 90 m
And, The length of rectangle = x + 20 = 90 + 20 = 110 m
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Find the value of sin D rounded to the nearest hundredth, if necessary.
The value of the trigonometric equation sin D = 0.923
What are trigonometric relations?Trigonometry is the study of the relationships between the angles and the lengths of the sides of triangles
The six trigonometric functions are sin , cos , tan , cosec , sec and cot
Let the angle be θ , such that
sin θ = opposite / hypotenuse
cos θ = adjacent / hypotenuse
tan θ = opposite / adjacent
tan θ = sin θ / cos θ
cosec θ = 1/sin θ
sec θ = 1/cos θ
cot θ = 1/tan θ
Given data ,
Let the triangle be represented as ΔBCD
Now , the measure of BC = 24
The measure of side CD = 10
So , the measure of hypotenuse BD = √ ( BC )² + ( CD )²
Substituting the values in the equation , we get
The measure of BD = √ ( 576 ) + 100
The measure of BD = √ ( 676 )
The measure of BD = 26
Now , from the trigonometric relations ,
sin θ = opposite / hypotenuse
Substituting the values in the equation , we get
sin D = 24 / 26
On simplifying the equation , we get
sin D = 0.923
Hence , the equation is sin D = 0.923
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3. If 17 and 36 are the lengths of two sides of a triangle, what is the range of possible values for the length of the third side?
Answer:
19 < x < 53
Step-by-step explanation:
given 2 sides of a triangle then the third side x is in the range
difference of 2 sides < x < sum of 2 sides , that is
36 - 17 < x < 36 + 17
19 < x < 53
composite functions homework
The composite function has its value to be g o h(x) = -20x^2 - 30x
How to determine the composite functionfrom the question, we have the following parameters that can be used in our computation:
h(x) = 4x + 6
g(x) = -5x
Using the above as a guide, we have the following:
g o h(x) = g(x) * h(x)
substitute the known values in the above equation, so, we have the following representation
g o h(x) = (4x + 6) * -5x
Evaluate
g o h(x) = -20x^2 - 30x
Hence, the value is g o h(x) = -20x^2 - 30x
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RECAP NEED HELP STILL
Using trigonometric functions and Pythagoras' theorem, the x value of different right-angled triangles is found.
What is a right-angled triangle?
A right triangle, also known as a right-angled triangle, is a triangle with one right angle, or two perpendicular sides. The sum of the other two angles is 90 degrees.
In all of these figures, one of the angles is 90°. So we can use Pythagoras' theorem and trigonometric relations, to solve the questions.
1) Opposite side = 5
sin 27° = Opposite side/ hypotenuse
0.45 = 5/x
x = 11.11
2) Hypotenuse = 16
cos 63 = adjacent side/hypotensue
0.45 = x / 16
x = 7.2
3) Hypotenuse = 29
sin 67 = opposite side/hypotensue
0.92 = x/29
x = 26.68
4) Opposite side = 27
tan 39° = opposite side/ adjacent side = 27/x
0.81 = 27/x
x = 33.33
5) sin Q = opposite side / hypotensue = 14/50 = 7/25
sin R = opposite side / hypotensue = [tex]\sqrt{50^2 - 14^2}[/tex]/50 = 48/50 = 24/25
cos Q = PQ/ 50 = 48/50 = 24/25
cos R = PR/50 = 14/50 = 7/25
tan Q = sin Q/cos Q = 7/24
tan R = sin R/cos R = 24/7
Therefore using trigonometric functions and Pythagoras' theorem, the x value of different right-angled triangles is found.
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What is the range of this equation
This is college algebra
The range is the set of y-coordinates of the function.
As per graph we can see:
All positive values included as well as zero;There is one negative value, at y = - 2.Add all together to get the range:
y = - 2 and y ≥ 0As interval the range is:
y ∈ {-2} ∪ [0, + ∞)helpppp geometry 8th grade
The length of the segment QV is 9.2 units
What is a square?
Regular quadrilaterals, such as a square, have four equal sides and four equal angles (right angles, 90-degree angles, or angles of /2 radian). It is also known as a rectangle with two neighbouring sides of identical length. It is the only regular polygon whose internal angle, central angle, external angle, and diagonal length are all equal (90°).
diagonal length, d=a√2 , where, d--> diagonal length , a= side length
So, d= 13* 1.4142 = 18.3847 units
Diagonals bisect each other
QV = d/2 = 18.3847/2 = 9.1923
Rounding to 1 decimal place
QV = 9.2 units
The length of the segment QV is 9.2 units
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How do you do part ii
The value of k is,
The probability distribution as a table:
r 1 2 3
P(X) 0 1/15 2/15
What is probability?Probability is a mathematical term, which can be defined as the ratio of the number of favorable outcomes to the total number of outcomes of an event. The possibility that an event will occur is measured by probability.
Probability of Event = Favorable Outcomes/Total Outcomes = X/n
To find the value of k, we can use the fact that the sum of the probabilities for all possible values of X must equal 1.
Therefore, we have:
P(X = 1) + P(X = 2) + P(X = 3) = k(4(1)(1²) + 4(2)(2²) + 4(3)(3²))
= 24k
Since we also know that P(X = 1) = 0, we have:
P(X = 1) + P(X = 2) + P(X = 3) = P(X = 2) + P(X = 3) = 0.8
Substituting this into the equation above, we get:
0.8 = 24k
k = 0.8/24 = 1/30
Therefore, the probability distribution can be written as:
r 1 2 3
P(X) 0 1/15 2/15
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picture in the box findiing the average
-
[tex]\cfrac{6}{4+\sqrt{2}}\implies \cfrac{6}{4+\sqrt{2}}\cdot \cfrac{4-\sqrt{2}}{4-\sqrt{2}}\implies \cfrac{6(4-\sqrt{2})}{\underset{\textit{difference of squares}}{(4+\sqrt{2})(4-\sqrt{2})}} \implies \cfrac{6(4-\sqrt{2})}{(4)^2 - (\sqrt{2})^2} \\\\\\ \cfrac{6(4-\sqrt{2})}{16 - 2}\implies \cfrac{6(4-\sqrt{2})}{14}\implies \cfrac{3(4-\sqrt{2})}{7}\implies \cfrac{12-3\sqrt{2}}{7}[/tex]
What is the surface area of the cylinder with height 8 in and radius 8 in? Round your
answer to the nearest thousandth.
Answer:
The surface area of a cylinder can be calculated using the formula:
Surface area = 2πr^2 + 2πrh
Where r is the radius and h is the height of the cylinder.
Plugging in the values we have:
Surface area = 2π(8^2) + 2π(8)(8) = 2π(64) + 2π(64) = 128π
Rounding to the nearest thousandth, we have:
Surface area = 128π = 403.23 in^2 (rounded to the nearest thousandth)
So the surface area of the cylinder with height 8 in and radius 8 in is 403.23 in^2.
Step-by-step explanation:
the company bought $15000 worth of equipment beginnning of year 2018 the equipment is est. to increase in value at a rate of 15.9% per year how many yers, t , after which the value of the company's new equipment will be less than 7500
The number of years, t , after which the value of the company's new equipment will be less than 7500 is 2.64 years
How to determine the valueTo solve this problem, we can use the formula for exponential growth:
V(t) = V₀ * (1 + r)^t
Given that the parameters are;
V(t) is the value of the equipment at a time tV₀ is the initial value of the equipment ($15,000)r is the growth rate (15.9% or 0.159)t is the time in yearsTo determine time t when the value of the equipment will be less than $7500.
Let's set up an inequality;
V(t) < 7500
Substituting the formula for V(t), we get:
V₀ * (1 + r)^t < 7500
Substitute the values
(1 + 0.159)^t < 0.5
t * log(1 + 0.159) < log(0.5)
t > log(0.5) / log(1 + 0.159)
Using a calculator, we get:
t > 2.64
Hence, the value is 2.64 years.
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Mrs. Imperiale's credit card has an APR of 13.2%. She does not ever pay her balance off in full, so she always pays a finance charge. Her next billing cycle starts today. The billing period is 31 days long. She is planning to purchase $7,400 worth of new kitchen cabinets this billing cycle. She will use her tax refund to pay off her entire bill next month. If she purchases the kitchen cabinets on the last day of the billing cycle instead of the first day, how much would she save in finance charges? Round to the nearest ten dollars.
If Mrs. Imperiale's credit card has an APR of 13.2%. The amount she would save in finance charges Round to the nearest ten dollars is $80.
What is the amount saved?Finance charge if bought on the first day
Finance charge = (31 × 7400 ÷ 31) × (0.132 ÷ 12)
Finance charge = 7400 × 0.011
Finance charge= $81.40
Finance charge if bought on the last day
Finance charge = (1 × 7400 ÷ 31) × (0.132 ÷ 12)
Finance charge = 238.709677 × 0.011
Finance charge= $2.625
Finance charge = $2.63
Savings = $81.40 - $2.63
Savings = $78.77
Savings = $80 ( Approximately)
Therefore the savings is $80.
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A line passes through the origin and (4, 6). What are two other points on this line?
Two other points on this line are (1, 1.5) and (2, 3)
How to determine the two other points on this line?From the question, we have the following parameters that can be used in our computation:
A line passes through the originAnd it passes through (4, 6).This means that the slope (m) of the line is
m = 6/4
Evaluate
m = 1.5
For the other points, we have
f(2) = 2 * 1.5 = 3
f(1) = 1 * 1.5 = 1.5
So, we have (1, 1.5) and (2, 3)
Hence, the points are (1, 1.5) and (2, 3)
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Find the equation of the line containing the points (-3, 11)
and (-4,1).
Write the equation in slope-intercept form.
The equation in slope-intercept form is y = 10x + 41.
What is the point-slope form?Mathematically, the point-slope form of a straight line can be calculated by using this mathematical expression:
y - y₁ = m(x - x₁) or y - y₁ = (y₂ - y₁)/(x₂ - x₁)(x - x₁)
Where:
m represents the slope.x and y are the points.Based on the information provided, we can logically deduce the following data points on the line:
Points on x-axis = (-3, -4).
Points on y-axis = (11, 1).
At point (-3, 11), a linear equation of this line can be calculated in slope-intercept form as follows:
y - 11 = (1 - 11)/(-4 + 3)(x + 3)
Y - 11 = 10(x + 3)
y = 10x + 30 + 11
y = 10x + 41.
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The area of the wall is 275 ft square
The number of gallon to cover the wall approximately is 3
the price of the paint is $73.5
How to solve for the area of the wall1. The area of the wall is given as l * w
this is the value that is used to solve for the area of a rectangle
the length is given as 10 ft
the width is given as 22 ft
the area would be 10 * 22
= 220 ft square
find the area of the triangle = rectangular part is given as height = 15 ft - 10 ft = 5 ft
base = 22 ft
area = 1/2 b h
= 0.5 * 22 * 5
= 55
total area = 220 + 55 = 275 ft square
2. If 1 gallon of paint covers 105 ft
the amount that would cover 275 ft would be gotten when we cross multiply
1 = 105 ft
x = 275 ft
275 ft = 105 x
x = 275 / 105
x = 2.619
x ~ 3 gallons of paint
3. If one gallon is 24.5 dollars, the total amount that you would purchase is 3 * 24.5
= $73.5
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9,100 dollars is placed in a savings account with an annual interest rate of 5%. If no money is added or removed from the account, which equation represents how much will be in the account after 6 years?
1.) M=9,100(1 + 0.05)^6
2.)M=9,100(1 - 0.05)^6
3.)M=9,100(1 + 0.05)(1 + 0.05)(1 + 0.05)
4.)M=9,100(0.95)^6
Answer:
1.) M=9,100(1 + 0.05)^6
Step-by-step explanation:
Compound Interest Rate Formula:
[tex]A=P(1+\frac{r}{n})^{nt}[/tex]
In this formula the "P" represents the principle amount, or the original amount. The "r" represents the interest rate in decimal form, while the "n" represents the number of compounds in the time unit (usually years), and the "t" represents the amount of time that has passed (usually years)
In this case it says annual interest rate of 5% and nothing of compound monthly, etc... so n=1, and r=0.05. We're also given the principle amount of 9,100 and the time passed is just 6 years, so t=6. Plugging all this information into the equation we get:
[tex]A=9,100(1+0.05)^6[/tex]
which makes the first option correct.
In Year 1, Kim Company sold land for $80,000 cash. The land had originally cost $60,000. Also, Kim sold inventory that had cost $110,000 for $198,000 cash. Operating expenses amounted to $36,000. Find Sales revenue: Cost of goods sold: Gross margin; Expenses; Operating expenses; Operating income; Non-Operating Items; Gain on sale of land; Net income?
As per the question Sales revenue is $198,000 (from the sale of inventory)
What is Sales revenue?Sales revenue, which is sometimes referred to as revenue from sales or just sales, is the entire sum of money that a business makes from the selling of goods or services to clients. It is one of the main revenue streams for the majority of businesses and is frequently used as a key performance indicator (KPI) to gauge a business's success.
Calculating sales income involves multiplying the quantity sold by the cost per unit. As an illustration, if a business sells 1,000 pieces of a product at $100 each, its sales revenue would be $100,000 ($100 x 1,000).
Sales revenue is a crucial indicator for businesses to monitor since it indicates how much demand there is for a company's goods or services.
According to question:
Cost of goods sold = $110,000 (the cost of the inventory that was sold)
Gross margin = Sales revenue - Cost of goods sold = $198,000 - $110,000 = $88,000
Expenses = Cost of goods sold + Operating expenses = $110,000 + $36,000 = $146,000
Operating income = Gross margin - Operating expenses = $88,000 - $36,000 = $52,000
Non-Operating Items = Gain on sale of land = $80,000 (the difference between the selling price and the original cost of the land)
Net income = Operating income + Non-Operating Items = $52,000 + $80,000 = $132,000
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Find the surface area of the prism.
S.A.
?
cm²
5cm
4cm
7cm
Please hurryyyy
The Total Surface Area for given prism will be 166 [tex]cm^2[/tex].
How to calculate the total surface area of Rectangular Prism?The entire surface area of a rectangular prism may be computed by adding the areas of its six sides. A rectangular prism's surface area may be determined using the following formula:
[tex]Surface Area = 2(l*w) + 2(l*h) + 2(w*h)[/tex]
where:
l = length of the rectangular prism
w = width of the rectangular prism
h = height of the rectangular prism
Using this formula for given problem,
Given,
l=5cm
w=4cm
h=7cm
[tex]\text{Total Surface area}=2.(5.7)+2.(4.5)+2.(4.7)\\\\=70+40+56\\\\=166\;cm^2[/tex]
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