a) The exponential decay function that models the situation whereby the value of houses in a city is decreasing at a rate of 3% per year is f(x) = 450,000 x 0.97^x.
b) The value of this house that currently costs $450,000, based on the above exponential decay function, 4 years from now is $398,381.76.
c) It will take 13.3 years till the value of the house is $300,000.
What is an exponential decay function?An exponential decay function describes an exponential function whereby the value of an asset reduces consistently at a constant percentage rate over a period.
The formula for an exponential decay is given as y=a(1-b)^x.
In this exponential decay formula, y is the final amount, a is the original amount, b is the decay factor, and x is the amount of time that has elapsed.
Finally, we can use an online finance calculator to determine the number of years till the value of the house reduces to $300,000.
The current cost of a house in the city = $450,000
The decreasing rate per year = 3%
Continuous annual decreasing factor = 0.97 (100% - 3%)
Let the value of the house in x years = f(x)
Exponential decay function:a) f(x) = 450,000 x 0.97^x
b) Value of the house 4 years from now = 450,000 x 0.97^4
= $398,381.76
c) The number of years till the value is $300,000:
300,000 = 450,000 x 0.97^x
I/Y (Interest per year) = -3%
PV (Present Value) = $450,000
PMT (Periodic Payment) = $-0
FV (Future Value) = $-300000
Results:
Number of period (#) = 13.312
Thus, the total Decay after 13.312 years is $150,000.00 ($450,000 - $300,000).
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Tom wishes to purchase a property that has been valued at $300,000. He has 25% of this amount available as a cash deposit, and will require a mortgage for the remaining amount. The bank offers him a 25-year mortgage at 2% interest. Calculate his monthly payments.
Round your answer to the nearest cent.
Do NOT round until you have calculated the final answer.
so hmmm 25% of that 300,000 is going as a downpayment, so he need the loan for the remaining 75% of that hmmm
[tex]\begin{array}{|c|ll} \cline{1-1} \textit{\textit{\LARGE a}\% of \textit{\LARGE b}}\\ \cline{1-1} \\ \left( \cfrac{\textit{\LARGE a}}{100} \right)\cdot \textit{\LARGE b} \\\\ \cline{1-1} \end{array}~\hspace{5em}\stackrel{\textit{75\% of 300000}}{\left( \cfrac{75}{100} \right)300000}\implies 225000[/tex]
so for that much, so since he'll be making monthly payments, the compounding period will be monthly, now, we're assuming the payments are at the end of each month.
[tex]~~~~~~~~~~~~\underset{\textit{payments at the end of the period}}{\textit{Payments of an ordinary annuity}} \\\\ pmt=A\left[ \cfrac{\frac{r}{n}}{\left( 1+\frac{r}{n} \right)^{nt}-1} \right][/tex]
[tex]\begin{cases} A=\textit{accumulated amount}\dotfill &225000\\ pmt=\textit{periodic payments}\\ r=rate\to 2\%\to \frac{2}{100}\dotfill &0.02\\ n= \begin{array}{llll} \textit{times it compounds per year}\\ \textit{monthly, thus twelve} \end{array}\dotfill &12\\ t=years\dotfill &25 \end{cases}[/tex]
[tex]pmt=225000\left[ \cfrac{\frac{0.02}{12}}{\left( 1+\frac{0.02}{12} \right)^{12 \cdot 25}-1} \right] \\\\\\ pmt=225000\left[ \cfrac{\frac{1}{600}}{\left( \frac{601}{600} \right)^{300}-1} \right]\implies pmt\approx 578.67[/tex]
Find the volume of the composite figure.
Figure not drawn to scale
The volume of the two cuboid added together will be 192 cm³.
what exactly is a cuboid?
A cuboid, also known as a rectangular prism, is a three-dimensional solid shape that has six rectangular faces. It is a type of polyhedron, a geometric figure with flat faces and straight edges.
A cuboid has three pairs of congruent and parallel faces, with each pair being congruent to the other. These pairs of opposite faces are known as bases, and the other four faces are called lateral faces. The lateral faces are also rectangles and are perpendicular to the bases.
Now,
As Volume of the cuboid= L*B*H
where l=length, B=Breadth and H=Height
and volume of the figure =volume of 2 cuboids
=8*4*3+10*3*4
=72+120
=192 cm³
Hence,
The volume of the two cuboid added together will be 192 cm³.
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Question 10
Solve for b.
b³ = 8
Enter your answer in the box.
Answer:
[tex]{ \sf{ {b}^{3} = 8}} \: \: \\ { \sf{ {b}^{3} = {2}^{3} }} \\ { \sf{ {(b}^{3}) {}^{ \frac{1}{3} } = {( {2}^{ 3}) }^{ \frac{1}{3} } }} \\ { \sf{b ={ \boxed{ 2}}}}[/tex]
Answer:
b=2
Step-by-step explanation:
[tex]b^{3} = 8\\\\b^{3} = 2^{3} \\\\b=+2[/tex]
In a school survey, Randy found that 5/12 of the students normally wear sneakers, and that
8/25 OF those who wear sneakers normally wear white sneakers. What fraction of the student body normally wears white sneakers?
Answer: 2/15
Step-by-step explanation:
S: student wearing an sneakers
W: student wearing a white sneakers
Data given:
P(S) = 5/12
P(S∩W) = 8/25
so to find
P(W) = P(S)*P(S∩W) = 8/25* 5/12 = 2/15
This is 2/15 of the total students wears white sneakers
Answer:
2/15 of the student body normally wears white sneakers
Step-by-step explanation:
5/12
multiplied by
8/25
equals
40/300 = 4/30 =
after simplification
2/15
Determine whether y varies directly with x if so, solve for the constant of variation k. 3y= -7x-18
This shows that any increase in x by a certain factor results in an increase in y by the same factor, confirming that y varies directly with x.
What is Linear equation ?
Linear equation can be defined as equation in which highest degree is one.
To determine if y varies directly with x, we need to check if there is a constant ratio between y and x. In other words, if we increase x by a certain factor, does y also increase by the same factor?
The equation 3y = -7x - 18 can be rewritten as y = (-7/3)x - 6. This is in the form of y = kx + b, where k is the constant of variation and represents the ratio between y and x.
Since the equation is in this form, we can say that y varies directly with x, and the constant of variation is k = -7/3.
To verify that y varies directly with x, we can check that any increase in x by a certain factor results in an increase in y by the same factor, as given by the constant of variation. For example, if we increase x by 3, then y will increase by (-7/3)(3) = -7. If we increase x by 6, then y will increase by (-7/3)(6) = -14.
Therefore, This shows that any increase in x by a certain factor results in an increase in y by the same factor, confirming that y varies directly with x.
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Solve x2 – 18x + 81 = 4 by completing the square. Select any solutions that apply. A. x = –11 B. x = –7 C. x = 7 D. x = 11
The solutions to the equation x² - 18x + 81 = 4 by completing the square are x = 9 + 2i and x = 9 - 2i.None of the answer choices A, B, C, or D are correct.
What is an equation?An equation is a mathematical statement that shows the equality between two expressions, often containing variables and mathematical operations.
To solve the equation x² - 18x + 81 = 4 by completing the square, we can follow these steps:
x² - 18x + 77 = 0
Divide both sides by the coefficient of x² to make the coefficient 1:
x² - 18x + (81/1) = -77/1
x² - 18x + 81 = -77
Add the square of half the coefficient of x to both sides of the equation:
x² - 18x + (9)² = -77 + (9)²
x² - 18x + 81 = -4
(x - 9)² = -4
x - 9 = ±√(-4)
x - 9 = ±2i (where i is the imaginary unit)
x = 9 ±2i
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7(y-5)=21 Help Please!!
Answer:
Y=8
Step-by-step explanation:
7(y-5)=21
distribute the 7
7y-35=21
get y by itself
7y=56
divide by 7
y=8
HOPE THIS HELPS YOU UNDERSTAND!
What is the solution of x-1/x^2 +5x+4 less than or equal to 0
Answer:
[tex]x-1/x^2 +5x+4[/tex] = no real value
Step-by-step explanation:
Step 1 : Multiply through by x^2
[tex]x^{2} -1 +5x^{3}+ 4x^{2}[/tex]
Step 2 : Collect like terms
[tex]5x^{3}+5x^{2} -1\geq 0[/tex]
Step 3 : Ignore the sign and solve for x
[tex]5x^{3} +5x^{2} -1 = 0\\x =0.380609458\\x= 0.4(2dp)[/tex]
Step 4 : Input back into the equation
Step 5: This shows that x-1/x^2 +5x+4 has no real values.
Find the equation of a straight line with the following gradients and points .1. 2,(7,2) .2. -2(6,-3)
Answer:
The gradient is given as m=1, and the point (7,2) lies on the line. Thus:
y - y1 = m(x - x1)
y - 2 = 1(x - 7)
y - 2 = x - 7
y = x - 5
So the equation of the line is y = x - 5.
Again, using the point-slope form of a straight line:
The gradient is given as m=-2, and the point (6,-3) lies on the line. Thus:
y - y1 = m(x - x1)
y - (-3) = -2(x - 6)
y + 3 = -2x + 12
y = -2x + 9
So the equation of the line is y = -2x + 9.
The perihelion is?
The equation for the orbit of planet A around the sun is?
The perihelion is the point in a planet's orbit where it is closest to the sun.
The equation for the orbit of a planet around the sun depends on various factors, such as the shape of the orbit, the mass of the planet, and the gravitational force between the planet and the sun. Kepler's laws of planetary motion provide a framework for understanding the motion of planets in orbit, and the equations used to describe these orbits are generally based on these laws. The specific equation for the orbit of planet A would depend on the specific parameters of that planet's orbit.
Find the value of x. 20 degrees and 114 degrees
By answering the presented question, we may conclude that as we know the sum of all angles is a triangle is 180; x = 46
What precisely is a triangle?A polygon is a triangle with four or more parts. It has a straightforward rectangular shape. Triangle ABC denotes a rectangle with the edges A, B, and C. Euclidean geometry produces a single plane and cube when the sides are not collinear. A triangle is a polygon if it contains three components and three angles. The corners are the points where a triangle's three edges meet. The angles of a triangle sum up to 180 degrees.
as we know the sum of all angles is a triangle is 180.
so, here,
20+114+x = 180
x = 180 - 134
x = 46
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5. A rock is thrown directly upward with an initial velocity of 79 feet per second from a cliff 50 feet above a beach. The height of the rock above the beach (h) after t seconds is given by the equation h = -16t² + 79t + 50. The graph below shows the rock's height as a function of time.
The rock will be at a height of 125 feet after 0.49 and 4.76 seconds.
Finding the time:In the given problem we have a function h(t) that represents the height of the rock that is from the ground of the beach where the variable represents the time travel by the rock.
Assume t as required time equates the given function to the given height and solve for the value of 't'.
Here we have
A rock is thrown directly upward with an initial velocity of 79 feet per second from a cliff 50 feet above a beach.
The height of the rock above the beach (h) after t seconds is given by the equation h(t) = -16t² + 79t + 50.
Let after t seconds the height will be 125 feet
=> h(t) = 125
=> -16t² + 79t + 50 = 125
=> -16t² + 79t - 75 = 0
To solve this quadratic equation, we can use the quadratic formula:
=> x = [-b ± √(b² - 4ac)]/ 2a
Here a = -16, b = 79, and c = -75.
t = [-79 ± √(79² - 4(-16)(-75))] / 2(-16)
t = (-79 ± √(6241 - 4800)) / -32
t = (-79 ± √1441) / -32
So, the two solutions are:
t = (-79 + √1441) / -32 and t = (-79 - √1441) / -32
t ≈ 0.497 or t ≈ 4.763
Therefore,
The rock will be at a height of 125 feet after 0.49 and 4.76 seconds
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A toy company is building dollhouse furniture. A rectangle door of a dollhouse has a height of 7 centimeters and a width of 3 centimeters. What is the perimeter of the door on a scale drawing that uses the scale 3.5?
Answer: To find the perimeter of the door on a scale drawing, we need to first determine the dimensions of the door on the scale drawing.
If the actual height of the door is 7 centimeters, then the height on the scale drawing will be:
7 cm ÷ 3.5 = 2 cm
Similarly, if the actual width of the door is 3 centimeters, then the width on the scale drawing will be:
3 cm ÷ 3.5 = 0.857 cm
Now we can use these dimensions to find the perimeter on the scale drawing:
Perimeter = 2 × (height + width) = 2 × (2 cm + 0.857 cm) = 2 × 2.857 cm = 5.714 cm
Therefore, the perimeter of the door on the scale drawing is 5.714 centimeters.
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What is the equation of the line in slope-intercept form that goes thru the point (8, -2) and has a slope of 1/4?
The equation of the line in slope-intercept form that goes through the point (8, -2) and has a slope of 1/4 is y = 1/4x - 4.
What is slope-intercept form?In slope-intercept form, the equation of a line is expressed as y = mx + b, where m denotes the slope of the line and b the y-intercept, or the location at where the line intersects the y-axis. In this form, the slope m denotes the line's steepness or the rate at which y changes in relation to x. A positive slope causes the line to go upward from left to right, whereas a negative slope causes the line to move downward from left to right. The value of y when x is 0, or the line's origin, is represented by the y-intercept, or b.
Given that, point (8, -2) and a slope of 1/4.
The slope-intercept form is given as:
y - y1 = m(x - x1)
Substituting the values:
y - (-2) = 1/4(x - 8)
y + 2 = 1/4x - 2
y = 1/4x - 4
Hence, the equation of the line in slope-intercept form that goes through the point (8, -2) and has a slope of 1/4 is y = 1/4x - 4.
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CAN SOMEONE HELP WITH THIS QUESTION?✨
By answering the presented question, we may conclude that As a result, trigonometry the abbreviated phrase is: 8 sin(c+l)
what is trigonometry?Trigonometry is the field of mathematics that explores the connection between triangle side lengths and angles. The issue first originated in the Hellenistic era, during the third century BC, as a result of the use of geometry in astronomical investigations. The subject of mathematics known as exact techniques is concerned with certain trigonometric functions and their possible applications in calculations. Trigonometry contains six commonly used trigonometric functions. Their separate names and acronyms are sine, cosine, tangent, cotangent, secant, and cosecant (csc). Trigonometry is the study of triangle characteristics, particularly those of right triangles. As a result, geometry is the study of the properties of all geometric forms.
tan (7 sin(c) + 8 cos(c)) (l)
We may utilise the trigonometric identity to simplify this expression:
sin(l) / cos(l) = tan(l) (l)
When we insert this into the original phrase, we get:
sin(l) / cos(c) (7 sin(c) + 8 cos(c)) (l)
By increasing the numerator, we get:
8 cos(c) sin + 7 sin(c) sin(l) (l)
Now we can apply the trigonometric identities:
(1/2) sin(a) cos(b)
[sin(a+b) plus sin(a-b)]
(1/2) cos(a) sin(b)
[sin(a+b) minus sin(a-b)]
We can write using these identities:
7 sin(c) sin(l) + 8 cos(c) sin(l) equals 7 (1/2).
[sin(c+l) minus sin(c-l)] + 8 (1/2) [sin(c+l) plus sin(c-l)]
= (7/2)sin(c+l) + (8/2)sin(c-l) + (8/2)sin(c+l) + (7/2)sin(c-l) - (7/2)sin(c-l) = 8 sin(c+l)
As a result, the abbreviated phrase is:
8 sin(c+l)
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9. A stainless-steel patio heater is shaped like a square pyramid. The length of one side of the base is 2 feet. The slant height is 9 feet. What is the height of the heater? Round to the nearest tenth of a foot
Answer:
The height of the patio heater is approximately 8.9 feet.
(-50) ÷ what is -1, number in the blank will be
Which statement correctly describes the value of the expression 8×7/9
A) less than 7/9
B) greater than 9
C) between 8 and 9
D) between 7/9 and 8
The value of the expression is between 7/9 and 8, since 7/9 < 56/9 < 8. So the correct option is D.
Describe Algebraic Expression?Algebraic expressions can represent real-world situations, formulas, and equations. They are commonly used in algebra, which is a branch of mathematics that deals with symbols and the rules for manipulating these symbols.
Algebraic expressions are important tools in solving equations and real-world problems that involve variables and unknowns. They are also used in calculus, physics, engineering, and other fields that require mathematical modeling and analysis.
The value of the expression 8×7/9 can be simplified using the order of operations (PEMDAS) as follows:
8×7/9 = (8×7)/9 = 56/9
Therefore, the value of the expression is between 7/9 and 8, since:
7/9 < 56/9 < 8
So the correct statement is: D) between 7/9 and 8.
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Avani is trying to find the height of a radio antenna on the roof of a local building. She stands at a horizontal distance of 21 meters from the building. The angle of elevation from her eyes to the roof ((point AA)) is 38^{\circ} ∘ , and the angle of elevation from her eyes to the top of the antenna ((point BB)) is 46^{\circ} ∘ . If her eyes are 1.66 meters from the ground, find the height of the antenna ((the distance from point AA to point BB)). Round your answer to the nearest tenth of a meter if necessary.
Answer:
Let's call the height of the antenna "h".
First, we can use the angle of elevation of 38^{\circ} ∘ to find the height of point A above the ground.
tan(38^{\circ}) = \frac{h}{21}
h = 21 \cdot tan(38^{\circ})
h \approx 15.6
So point A is approximately 15.6 meters above the ground.
Next, we can use the angle of elevation of 46^{\circ} ∘ to find the height of point B above the ground.
tan(46^{\circ}) = \frac{h}{d}
h = d \cdot tan(46^{\circ})
We can find the value of "d" using the Pythagorean theorem.
d^2 = 21^2 + 15.6^2
d \approx 25.7
So the distance from point A to point B is approximately 25.7 meters.
Finally, we can use the height of point A and the distance from point A to point B to find the height of point B (the height of the antenna).
h = d \cdot tan(46^{\circ})
h \approx 25.7 \cdot tan(46^{\circ})
h \approx 23.2
Therefore, the height of the antenna is approximately 23.2 meters.
Step-by-step explanation:
the scenario creates 2 right-angled triangles.
both have the same first leg : the horizontal distance from Avani's eyes to the building (21 m).
and both have a right angle (90°) at the point, where the horizontal distance meets the building.
the difference is now the second leg : the height of the building (starting at 1.66 m above ground), and the height of the building plus the height of the antenna (again starting at 1.66 m above ground).
another difference is the length of the line of sight (from Avani to AA, and from Avani to BB).
driving these differences is the difference in the angle at Avani (38° vs. 46°).
now, remember the law of sine :
a/sin(A) = b/sin(B) = c/sin(C)
a, b, c are the sides of the triangle, A, B, C are the corresponding opposite angles of the triangle.
and remember : the sum of all angles in a triangle is always 180°.
what is the plan ?
we need to calculate the second leg of the larger triangle, and then the second leg of the smaller triangle and subtract that from the second leg of the larger triangle.
in other words :
(building + antenna) - building = antenna
so, we start with the larger triangle (up to BB).
the angle at Avani is 46°.
the angle at the building is 90°.
the angle at BB is then
180 - 90 - 46 = 44°.
21/sin(44) = (building + antenna)/sin(46)
(building + antenna) = 21×sin(46)/sin(44) =
= 21.74613659... m
now, for the smaller triangle (up to AA).
the angle at Avani is 38°.
the angle at the building is 90°.
the angle at AA is then
180 - 90 - 38 = 52°.
21/sin(52) = building/sin(38)
building = 21×sin(38)/sin(52) = 16.40699816... m
the height of the antenna is then again
(building + antenna) - building = 5.339138433... m
≈ 5.3 m
Solve for s. 0.5s + 1=7+4.5s=
Answer:
s = -1.5
Step-by-step explanation:
0.5s + 1 = 7 + 4.5s
So we can combine like terms
Put 0.5s to other side
Put 7 to other side
Then you get the equation:
1 - 7 = 4.5s - 0.5s
So we simplify:
-6 = 4s
That means
s = -6/4
s = -1.5
Hope this helps!
 Find the area of the shaded sector.
Answer In Exact Form (don't put pi in calculator, simplify your decimal answer to a fraction, and put pi symbol in answer).
The area of the shaded sector is equal to: A. 415π/2 ft².
How to calculate the area of a sector?Mathematically, the area of a sector can be calculated by using this formula:
Area of sector = θπr²/360
Where:
r represents the radius of a circle.θ represents the central angle.Substituting the given parameters into the area of a sector formula, we have the following;
Area of sector = 332(π/180) × (15)²/2
Area of sector = 74,700π/180 × 1/2
Area of sector = 415π/2 ft²
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The function g(x) is shown on the graph.
What is the equation of g(x) in vertex form?
g(x) = (x − 4)2 − 3
g(x) = (x − 4)2 + 3
g(x) = (x + 4)2 − 3
g(x) = (x + 4)2 + 3
Answer:
The correct answer is g(x) = (x+4)2+3
Step-by-step explanation:
The graph is sifted 3 units up and 4 units left.
4. In a batch of 100 CDs, 6 are defective. A sample of three CDs is to be selected at random. What is the probability that two of the three CDs will be defective?
Answer: The probability that two of the three CDs will be defective is approximately 0.01044 or 1.044%.
Step-by-step explanation: We can use the binomial distribution to solve this problem. Let X be the number of defective CDs in a sample of three. Then X follows a binomial distribution with parameters n = 3 and p = 6/100, where n is the sample size and p is the probability of a CD being defective.
The probability of getting exactly two defective CDs in a sample of three can be calculated using the binomial probability formula:
P(X = 2) = (3 choose 2) * (6/100)^2 * (94/100)^1
where (3 choose 2) = 3 is the number of ways to choose 2 defective CDs out of 3.
Simplifying this expression, we get:
P(X = 2) = 3 * (6/100)^2 * (94/100)
P(X = 2) = 0.01044
Therefore, the probability that two of the three CDs will be defective is approximately 0.01044 or 1.044%.
Answer: working on it
Step-by-step explanation:
What is entrepreneurs education
Answer: What an entrepreneur really is, though, is someone who runs their own business and takes a risk to do it.
Step-by-step explanation:
T is the reflection of t across the line x=6 if the coordinates t are(-3,7) what are the coordinates of t
Therefore , the solution of the given problem of coordinates comes out to be , T's values are (15, 7).
Describe coordinate.
A coordinate system can be used to precisely find points or additional mathematical objects on such a space, including Euclidean space, by using one or more variables or coordinates. To find a point or item on a double plane, one uses coordinates, which are pairs of numbers. Two numbers called the y and x matrices are used to describe a point's location on a two-dimensional plane. a set of numbers used to identify specific locations. The number usually consists of two digits.
Here,
In other terms, the x-coordinate of T is 6 times the difference between t and 6, or:
=> T's x-coordinate is 6 plus (6 minus (-3)) = 15
We can use the fact that the line of reflection is just the perpendicular bisector of the section joining t and to determine the y-coordinate of T. T's separation from the line
=> x=6 is 6 - (-3) = 9,
which is also T's separation from the line x=6.
The y-coordinate of T is the same as the y-coordinate of t because the line of reflection is the perpendicular bisector of the section joining t and T, which is:
=>T has a y-coordinate of 7.
Consequently, T's values are (15, 7).
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Tara creates a budget for her weekly expenses. The graph shows how X much money is in the account at different times. Find the slope of the line. Then tell what rate the slope represents.
The slope of the line is -50 and it means that the amount of money in the account is decreasing at a rate of $50 every week.
What is meant by the slope of the line?
A line's slope is defined as the ratio of the change in the y coordinates to the change in the x coordinate. Both the net change in the y-coordinate and the net change in the x-coordinate are denoted by y and x, respectively.
As a result, m = change in y/change in x is the formula for the change in the y-coordinate with respect to the change in the x-coordinate.
where "m" represents a line's slope.
A line's slope provides information on the steepness and direction of the line. By calculating the difference between the coordinates of the two points, (x1,y1) and (x2,y2), it is simple to calculate the slope of a straight line between them.
The complete question is given below.
The two points on the graph are (4, 2400) and (12, 2000).
(x₁ , y₁) = (4, 2400)
(x₂ , y₂) = (12, 2000)
The slope of the graph can be found using the following formula.
Slope m = [tex]\frac{y_2-y_1}{x_2-x_1}[/tex] = [tex]\frac{2000-2400}{12-4}[/tex] = [tex]\frac{-400}{8}[/tex] = -50
Therefore the slope of the line is -50 and it means that the amount of money in the account is decreasing at a rate of $50 every week.
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I will mark you brainiest!
Which of the following methods is not used to prove triangles are congruent?
A) AAA
B) SAS
C) SSS
D) ASA
Answer:
A) AAA yessss
Find the sum of the first n terms
using the formula:
a(1-r^n)/1-r
1, 5/3, 25/9, 125/27, 625/81
This would be a big help
The total of the first four terms is thus 8/3.
What does sum mean?The outcome of adding two or even more numbers or phrases is known as the sum in mathematics. The sum is a method of bringing things together as a result. To put it another way, adding any number of numbers together results in a previous result or total.
The sum of a Fibonacci sequence that has the initial component a = 1 and the general ratio r = 5/3 is determined using the formula you gave.
We enter these numbers into the formula to determine the sum of the initial n terms:
S(n) = [tex]a(1-r^n)/(1-r)[/tex]
S(n) = [tex]1(1-(5/3)^n)/(1-5/3)[/tex]
S(n) = [tex]3/2(1-(5/3)^n)[/tex]
So, we add n to this formula to get the sum of the initial n terms of a given sequence:
S(n) = [tex]3/2(1-(5/3)^n)[/tex]
For instance, we replace n = 4 to get the sum of the initial four terms:
S(4) = [tex]3/2(1-(5/3)^4)[/tex]
S(4) = 3/2(1-625/81)
S(4) = 3/2(144/81)
S(4) = 72/27
S(4) = 8/3
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The total of the first four terms is thus 8/3.
What does sum mean?The outcome of adding two or even more numbers or phrases is known as the sum in mathematics. The sum is a method of bringing things together as a result. To put it another way, adding any number of numbers together results in a previous result or total.
The sum of a Fibonacci sequence that has the initial component a = 1 and the general ratio r = 5/3 is determined using the formula you gave.
We enter these numbers into the formula to determine the sum of the initial n terms:
S(n) = [tex]a(1-r^{n} )/(1-r)[/tex]
S(n) = [tex]1(1-(5/3)^{n} /(1-5/3)[/tex]
S(n) = [tex]3/2(1-(5/3)^{n} )[/tex]
So, we add n to this formula to get the sum of the initial n terms of a given sequence:
S(n) = 3/2(1 - [tex](5/3)^{n}[/tex] )
For instance, we replace n = 4 to get the sum of the initial four terms:
S(4) = [tex]3/2(1-(5/3)^{4} )[/tex]
S(4) = 3/2(1-625/81)
S(4) = 3/2(144/81)
S(4) = 72/27
S(4) = 8/3
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complete ques is:
Find the sum of the first n terms ( 1,2,3,4,5.......n)
using the formula:
a(1-r^n)/1-r
1, 5/3, 25/9, 125/27, 625/81
Multiply 2 1. Simplify the answer and write as a mixed number.
O 4/
O
88
18
18
0416
25/
229
4
After simplifying a mixed number is 5 1/16
A mixed number is a combination of a whole number and a fraction.
It is typically written in the form "a b/c", where "a" is the whole number, "b" is the numerator of the fraction, and "c" is the denominator of the fraction.
For example, 3 1/2 is a mixed number, where 3 is the whole number, 1 is the numerator of the fraction, and 2 is the denominator of the fraction. This mixed number can also be expressed as an improper fraction as follows:
3 1/2 = (3 × 2 + 1) / 2 = 7/2.
Conversely, an improper fraction can be converted to a mixed number by dividing the numerator by the denominator to obtain the whole number and expressing the remainder as a fraction.
To multiply 2 1/4, follow these steps:
1. Convert the mixed number to an improper fraction: 2 1/4 = (2 × 4 + 1) / 4 = 9/4
2. Multiply the improper fraction by itself: (9/4) × (9/4)
3. Multiply the numerators: 9 × 9 = 81
4. Multiply the denominators: 4 × 4 = 16
5. Write the result as a fraction: 81/16
6. Simplify the fraction by converting it to a mixed number:
81 ÷ 16 = 5, with a remainder of 1.
So, 81/16 = 5 1/16.
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Solve this proof. (Flow chart proof)
Given: HF || GK, angle F and angle K are right angles.
Prove: FG congruent to KH
FG and KH are congruent using the AAS theorem. ∠F = ∠K and ∠G = ∠H
What is the AAS congruence theoremThe AAS (Angle-Angle-Side) Congruence Theorem is a geometric theorem that states that if two angles and a non-included side of one triangle are congruent to two angles and the corresponding non-included side of another triangle, then the two triangles are congruent.
In other words, if two triangles have two corresponding angles that are congruent, and the included side between these angles is also congruent in both triangles, then the two triangles are congruent.
The diagram shows that we have two triangles here. The first triangle is equal to the second triangle.
This is shown by the fact that the angle at F = angle at K
the angle at H = angle at G
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Answer:
use AAS for this
Step-by-step explanation: