The stem and leaf for the split between hundreds place and the tens place is 74 and 5 respectively.
What is stem and leaf plot?A stem and leaf plot also called a stem and leaf diagram is a way of organizing data into a form that makes it easy to observe the frequency of different types of values. It is a graph that shows numerical data arranged in order. Each data value is broken into a stem and a leaf.
Given that, 600, 600, 600, 610, 610, 610, 610, 610, 610, 610, 610, 610, 610, 610, 612, 620, 620, 625, 629, 631, 635, 638, 640, 640, 645, 646, 650, 651, 660, 660, 665, 671, 671, 674, 680, 693, 700, 705, 706, 707, 707, 715, 715, 719, 720, 725, 727, 732, 738, 739 and 745.
a) Split between hundreds place and the tens place.
60| 0 0 0
61| 1 1 1 1 1 1 1 1 1 1 1 2
62| 0 0 5 9
63| 1 5 8
64| 0 0 5 6
65| 0 1
66| 0 0 5
67| 1 1 4
68| 0
69| 3
70| 0 5 6 7 7
71 | 5 5 9
72| 0 5 7
73| 2 8 9
74| 5
b) Split between the tens place and the ones place.
6| 00 00 00 10 10 10 10 10 10 10 10 10 10 10 12 20 20 25 29 31 35 38 40 40 45 46 50 51 60 60 65 71 71 74 80 93
7| 00 05 06 07 07 15 15 19 20 25 27 32 38 39 45
Therefore, stem and leaf for the split between hundreds place and the tens place is 74 and 5 respectively.
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In the walkathon, Jose asks his sponsors to donate $10 for the first 5 kilometers he walks and $1 per kilometer after 5 kilometers
Sketch a graph that represents the relationship between the money collected from each sponsor and the number of kilometers walked.
The resulting graph should have a vertical intercept at (0, 0), a flat portion from (0, 0) to (5, 10), and a linearly increasing portion from (5, 10) to (10, 15). The slope of the second line should be $1 per kilometer.
Describe Graph?In mathematics, a graph is a visual representation of a set of data or a mathematical function. It consists of a collection of points, called vertices, and the lines or curves, called edges, that connect them. A graph can be used to show relationships between sets of data, to model real-world situations, and to represent mathematical functions.
There are many types of graphs, including bar graphs, line graphs, pie charts, scatter plots, and more. Each type of graph is used to represent different types of data or to show different relationships between the data.
Bar graphs are used to show the frequency or quantity of discrete data items, such as the number of people who prefer a certain type of food. Line graphs are used to show the relationship between two sets of data, such as the relationship between temperature and time. Pie charts are used to show the relative proportions of different parts of a whole, such as the percentage of a budget that is allocated to different expenses. Scatter plots are used to show the relationship between two sets of numerical data, such as the relationship between height and weight.
Graphs are an important tool in mathematics and many other fields, including economics, engineering, physics, and computer science. They allow us to visualize and analyze complex sets of data and to make predictions about future trends or patterns.
We can sketch a piecewise linear graph to represent the relationship between the money collected from each sponsor and the number of kilometers walked:
For the first 5 kilometers, the sponsor donates a flat rate of $10.
After the first 5 kilometers, the sponsor donates $1 per kilometer.
To sketch this graph, we can plot two points:
(0, 0): This represents the starting point of the walkathon, where no money has been collected yet.
(5, 10): This represents the end of the first 5 kilometers, where the sponsor has donated a flat rate of $10.
Then, we can draw a line connecting these two points to represent the flat rate portion of the donation.
Next, we can plot a third point:
(10, 15): This represents the end of the next 5 kilometers (from 5 to 10 kilometers), where the sponsor has donated an additional $5 ($1 per kilometer).
Finally, we can draw a second line connecting (5, 10) to (10, 15) to represent the $1 per kilometer portion of the donation.
The resulting graph should have a vertical intercept at (0, 0), a flat portion from (0, 0) to (5, 10), and a linearly increasing portion from (5, 10) to (10, 15). The slope of the second line should be $1 per kilometer.
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how can we say that 4:1 and 12:3 are equivalent ratios
Step-by-step explanation:
This is because when 12 : 3 is simplified it will give you 4 : 1
3 will go into 12 four times and 3 will go into 3 once, leaving 4 : 1
Therefore, 4 : 1 and 12 : 3 are equivalent ratios
Eve had to purchase 2 bags of chocolate chips for her cookie recipe. She paid $20 and received $5.86 in change. How much was each bag of chocolate chip
This question has 3 parts.
Part A: What does the variable represent in this situation?
Part B Which of the following equations represents how much each bag of chocolate chips costs?
Part C What is the price of each bag of chocolate chips?
Part A: The variable in this situation represents the unit cost or the unit rate of each bag of chocolate.
Part B: The equation that represents the cost of each bag of chocolate chips is x = (20 - 5.86)/2.
Part C: The price of each bag of chocolate chips that Eve bought for her cookie recipe is $7.07.
What is an equation?An equation is an algebraic statement of the equality or equivalence of two or more mathematical expressions.
Mathematical expressions combine constants, numbers, variables, and values with algebraic operands but without the equation symbol (=) as an equation.
The number of bags of chocolate chips bought = 2 bags
The total amount given to the cashier for the purchase = $20
The balance in change received = $5.86
The cost of the 2 bags of chocolate chips = $14.14 ($20 - $5.86)
The cost of each bag = $7.07 ($14.14)
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ind the limit of the function f(x,y) = sin(2(x^2 + y^2)))/2(x^2 + y^2) as (x, y) + (0,0). Assume that polynomials, exponentials, logarithmic, and trigonometric functions are continuous. [Hint: limt 40 sint = 1.) lim (x,y)->(0,0) sin(2(x^²+y^2))/2(x^2+y^2) = ____
The limit of the given function f(x,y) as (x,y) approaches (0,0) is 0.
What is function ?
Function can be defined in which it relates an input to output.
To find the limit of the given function[tex]f(x,y) = sin(2(x^2 + y^2))/(2(x^2 + y^2))[/tex]as [tex](x,y)[/tex] approaches (0,0), we can use the squeeze theorem.
First, note that [tex]sin(2(x^2 + y^2))[/tex]is bounded between -1 and 1 for all (x,y), since the sine function is bounded between -1 and 1. Therefore, we have:
[tex]-1/(2(x^2 + y^2)) < = sin(2(x^2 + y^2))/(2(x^2 + y^2)) < = 1/(2(x^2 + y^2))[/tex]
Next, we can take the limit as (x,y) approaches (0,0) of both sides of this inequality using the squeeze theorem. The left-hand side approaches 0, and the right-hand side approaches 0 as well. Therefore, by the squeeze theorem, we have:
lim (4/3)π(21.03)³- (4/3)π(20.97)³
Hence, the limit of the given function f(x,y) as (x,y) approaches (0,0) is 0.
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What is the equation of the midline for the function f(x)? f(x)=12sin(x)+6 enter your answer in the box.
The equation of the midline for the function f(x) = 12sin(x) + 6 is y = 12. The midline of a periodic function is a horizontal line that represents the average value of the function over one period.
For a sinusoidal function, the midline is the line that passes through the center of the graph, or the average of the maximum and minimum values of the function.
To find the midline equation for the function f(x) = 12sin(x) + 6, we first need to find the maximum and minimum values of the function. The amplitude of a sinusoidal function is half the difference between its maximum and minimum values. In this case, the amplitude is 12, so the maximum value is 12+6=18, and the minimum value is 6-12=-6.
The midline of the function is the line halfway between the maximum and minimum values, or at a height of (18 - 6)/2 + 6 = 12. Therefore, the equation of the midline is y = 12. This means that the function oscillates above and below this line by a maximum of 12 units.
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Veston 20 This scatter plot shows the relationship between the age and the average emails per day. The line of best fit is shown on the graph. a. The y-intercept of the estimated line of best fit is at (0, b). Enter the approximate value of b. b= (Enter your estimate to the nearest whole number.) b. Enter the approximate slope of the estimated line of best fit in the second box. slope=24 (Enter your estimate to the nearest tenth.) Average Emails per Day 40 30 20 10 0 0 Emails per Day by Age 12 24 36 48 60 Age 72
Answer:
Error refresh.
Step-by-step explanatithanksforfreepointlolon:
Answer:
a. The y-intercept of the estimated line of best fit is at (0, b). Enter the approximate value of b.
b. Approximately 8.
b. Enter the approximate slope of the estimated line of best fit in the second box. slope=24 (Enter your estimate to the nearest tenth.)
Approximately 2.4.
PLS HELP! Divide.
(x4 +14) = (x + 2)
x[²] + [ ]x² + [ ]x + [ +
x+2
please see the picture I but the answer on the top and the explanation in the bottom.
In the diagram, ABCD - A'B'C'D'. What are the angle measures of A'B'C'D'?
The measures of the angles are given as A' = 103, B' =100, c' = 80, D' = 77
How to solve for the angles∠x
125 + ∠x = 180 (angle on a straight line)
∠x = 55 degrees
∠y
∠x + ∠y + 48 = 180 angles in a triangle
55 + ∠y + 48 = 180
∠y = 77 degrees
∠D
∠d = ∠Y vertically opposite
∠a + ∠D = 180
∠A = 180 - 77
= 103 degrees
∠B + 80 = 180
∠b = 100 degrees
∠c + ∠ b = 180
∠c = 180 - 100
= 80 degrees
hence A' = 103, B' =100, c' = 80, D' = 77
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PLEASE ANSWER QUICKLY! 20 POINTS
0.1728 is the correct answer. This represents the proportion of suburban park users who bike on the trail,
What does propotion mean?Proportion is a mathematical term that describes the relationship between two values. It is used to compare two parts of a whole, two ratios, or two fractions. It is expressed as a ratio, fraction, or percentage.
For example, if a person has 3 apples and 2 oranges, the proportion is 3:2 or 3/2. This means that for every 3 apples, there are 2 oranges.
Proportion can also be used to compare the size of two objects. For example, if one object is twice as long as the other, the proportion is 2:1. Proportion can also be used to compare two fractions, such as 1/4 and 1/2. In this example, the proportion is 1:2, as 1/4 is half of 1/2.
Proportion is also used to compare two percentages, such as 30% and 60%. In this example, the proportion is 3:6, as 30% is half of 60%.
Step 1: Calculate the total number of users on the suburban park trail by adding the numbers in the 'Suburban' column in the table: 125 + 76 + 42 = 243.
Step 2: Calculate the proportion of suburban park users who bike on the park trail by dividing the number of bike users (42) by the total number of users (243): 42/243 = 0.1728.
Step 3: Round the answer to the nearest thousandth: 0.1728 ≈ 0.1730.
Answer: The proportion of suburban park users who bike on the park trail is 0.1730.
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The population of a city increases by 0.5% per year. If this year's population is 201,000, what will next year's population be, to the nearest individual?
Next year's population is 202,005
How to calculate the quantity of next year's population?
The population of a city increases by 0.5% per year
This year's population is 201,000
Next year's population can be calculated as follows
201,000 × 0.5/100
= 201,000 × 0.005+1
= 201,000 × 1.005
= 202,005
Hence next year's population is 202,005
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Solve the quadratic equation numerically (using tables of x- and y- values). x(x + 3) = 0 a. x = -1 or x = 3 c. x = 0 or x = -3 b. x = 0 or x = -5 d. x =1 or x = -1 Please select the best answer from the choices provided A B C D
Explanation:
If A*B = 0, then either A = 0 or B = 0 or both are zero. This is the zero product property.
For this problem we'll have x(x+3) = 0 lead to x = 0 or x+3 = 0
Solve x+3 = 0 to get x = -3
ay+3y+9=27 solve for y
Finally, we can solve for y by dividing both sides by (A + 3):
y = 18 / (A + 3)
Therefore, the solution for y is y = 18 / (A + 3).
How do you define an equation?By connecting two expressions with an equal sign, a mathematical statement known as an equation is produced. An equation is something like 3x - 5 = 16. The answer of this equation, which indicates that the value of the variable x is 7, is 7.
To solve for y in the equation Ay + 3y + 9 = 27, we need to isolate y on one side of the equation. We can do this by first combining the like terms on the left-hand side of the equation, and then subtracting 9 from both sides to get:
Ay + 3y = 18
Next, we can factor out the y term on the left-hand side:
y(A + 3) = 18
Finally, we can solve for y by dividing both sides by (A + 3):
y = 18 / (A + 3)
Therefore, the solution for y is y = 18 / (A + 3).
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.
This time, choose the figure that is a cylinder.
Answer: D.
Step-by-step explanation: It's just a cylinder how can you not see
How do you solve this
Answer:
Step-by-step explanation:
1st you solve the triangle by L x W then round it by x 10, hope this helps!
This problem refers to triangle ABC. If B = 150°, C = 20°, and c = 21 inches, find b. (Round your answer to the nearest whole number.)
b = ? in
Answer:
Step-by-step explanation:
To solve for b, we can use the law of sines, which states that in any triangle ABC:
a/sin(A) = b/sin(B) = c/sin(C)
Here, we are given B = 150°, C = 20°, and c = 21 inches. We can solve for the remaining angle A by using the fact that the angles of a triangle add up to 180°:
A + B + C = 180°
A = 180° - B - C
A = 180° - 150° - 20°
A = 10°
Now we can use the law of sines to solve for b:
a/sin(A) = b/sin(B)
a = c * sin(A)/sin(C) = 21 * sin(10°)/sin(20°)
b = a * sin(B)/sin(A) = 21 * sin(10°)/sin(20°) * sin(150°)/sin(10°)
b = 21 * sin(150°)/sin(20°)
Using a calculator, we get:
b ≈ 41 inches (rounded to the nearest whole number)
Therefore, the length of side b is approximately 41 inches.
Round 317,675 to the nearest ten thousand
Answer:320000
Step-by-step explanation:
E11.3 (LO 1, 2) (Depreciation Computations—SYD, DDB—Partial Periods) Judds Company purchased a new plant asset on April 1, 2020, at a cost of $711,000. It was estimated to have a service life of 20 years and a salvage value of $60,000. Judds’ accounting period is the calendar year. Instructions a. Compute the depreciation for this asset for 2020 and 2021 using the sum-of-the-years’-digits method. b. Compute the depreciation for this asset for 2020 and 2021 using the double-declining-balance method.
that in the second year, we use the beginning book value of $639,900
a. Sum-of-the-years’-digits method:
To compute the depreciation using the sum-of-the-years’-digits method, we first need to determine the total number of years of the asset's useful life. We do this by subtracting the salvage value from the cost and dividing by the estimated yearly depreciation.
Cost of asset = $711,000
Salvage value = $60,000
Useful life = 20 years
Yearly depreciation = (Cost - Salvage value) / Useful life
Yearly depreciation = ($711,000 - $60,000) / 20 = $32,550
To calculate the sum-of-the-years’-digits (SYD) for this asset, we add up the digits of the useful life in descending order. For a 20-year useful life, the SYD would be:
SYD = 20 + 19 + 18 + ... + 1 = 210
Using the SYD and the number of remaining years, we can calculate the depreciation expense for each year as follows:
Year 2020:
Depreciation expense = (20/210) x ($711,000 - $60,000) = $64,286
Year 2021:
Depreciation expense = (19/210) x ($711,000 - $60,000) = $60,952
b. Double-declining-balance method:
To compute the depreciation using the double-declining-balance (DDB) method, we first need to determine the asset's straight-line depreciation rate, which is calculated as follows:
Straight-line depreciation rate = 1 / Useful life
Straight-line depreciation rate = 1 / 20 = 0.05
The DDB depreciation rate is twice the straight-line rate, or 0.10. We can then calculate the depreciation expense for each year as follows:
Year 2020:
Depreciation expense = Beginning book value x DDB rate
Beginning book value = Cost of asset
Depreciation expense = $711,000 x 0.10 = $71,100
Year 2021:
Depreciation expense = Beginning book value x DDB rate
Beginning book value = Cost of asset - Accumulated depreciation from previous years
Accumulated depreciation (2020) = $71,100
Beginning book value (2021) = $711,000 - $71,100 = $639,900
Depreciation expense = $639,900 x 0.10 = $63,990
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Help Help Help Help Help Help (I don’t need explanation just yes or no)
the equation "y = 2x + 7" represents a proportional relationship.
Alan invests $200 at a rate of per year compound interest. After 2 years the value of this investment is $206.46. Show that r²t 200r - 323=0
Answer:
unfortunately tdudeyiutddj try Zurich etu
read in the values for a tic tac toe game and evaluate whether x or o won the game. the first number in the files represents the number of data sets to follow. each data set will contain a 9 letter string. each 9 letter string contains a complete tic tac toe game.
To evaluate whether x or o won the tic tac toe game, we need to check for the three possible winning conditions:
- A horizontal row of three x's or o's
- A vertical column of three x's or o's
- A diagonal of three x's or o's
Here's the step-by-step process:
1. Read in the first number from the file, which represents the number of data sets to follow.
2. For each data set, read in the 9 letter string representing the tic tac toe game.
3. Check for the three winning conditions by comparing the values in the string.
4. If any of the winning conditions are met, return the winning player (x or o).
5. If none of the winning conditions are met, return "No winner".
Here's the code in Python:
```
# Read in the first number from the file
num_data_sets = int(input())
# Loop through each data set
for i in range(num_data_sets):
# Read in the 9 letter string
game = input()
# Check for the three winning conditions
if (game[0] == game[1] == game[2]) or (game[3] == game[4] == game[5]) or (game[6] == game[7] == game[8]) or (game[0] == game[3] == game[6]) or (game[1] == game[4] == game[7]) or (game[2] == game[5] == game[8]) or (game[0] == game[4] == game[8]) or (game[2] == game[4] == game[6]):
# If any of the winning conditions are met, return the winning player
print(game[0])
else:
# If none of the winning conditions are met, return "No winner"
print("No winner")
```
This code will read in the values for a tic tac toe game and evaluate whether x or o won the game.
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Determine the limit using what you know about special limits:
The limits represented by [tex]\lim _{x\to 0}\left(\frac{\sin\left(x\right)}{13x}\right)[/tex] has its value to be 1/13
How to determine the limitsFrom the question, we have the following parameters that can be used in our computation:
[tex]\lim _{x\to 0}\left(\frac{\sin\left(x\right)}{13x}\right)[/tex]
To determine the limits, we make use of the L'Hôpital's rule
Using the above as a guide, we have the following:
[tex]\lim _{x\to 0}\left(\frac{\sin\left(x\right)}{13x}\right) = \lim _{x\to 0}\left(\frac{\cos\left(x\right)}{13}\right)[/tex]
Substitute the known values in the above equation, so, we have the following representation
[tex]\lim _{x\to 0}\left(\frac{\sin\left(x\right)}{13x}\right) = \frac{\cos\left(0\right)}{13}\right)[/tex]
This gives
[tex]\lim _{x\to 0}\left(\frac{\sin\left(x\right)}{13x}\right) = \frac{1}{13}\right)[/tex]
Hence, the value is 1/13
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If the value of XYZ Company stock drops from $25 per share to $21 per share, what is the percent of the decrease?
The percentage of the decrease in the value of the XYZ Company stock is 16%.
What is the percentage?The percentage is the ratio of the composition of matter to the overall composition of matter multiplied by 100.
Here,
The decrease in the value of the stock is $25 - $21 = $4.
To find the percent decrease, we need to divide the decrease by the original value and then multiply by 100:
Percent decrease = (Decrease / Original value) x 100
In this case, the original value is $25, so:
Percent decrease = (4 / 25) x 100 = 16%
Therefore, the percentage of the decrease in the value of the XYZ Company stock is 16%.
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Daniela brought 1/4 of a pound of choclate chip cookies to school and Emily brought 3/7 of a pound of peanut butter cookies.
How many pounds of cookies do we have in total?
Answer:
19/28
Step-by-step explanation:
1/4 = 7/28
3/7 = 12/28
Then:
1/4 + 3/7 = 7/28 + 12/28 = (7+12)/28
= 19/28
-95 times a number -14 is equal to -70 one less thing the number
The equation for the given statement can be written as:
-95x - 14 = -70 - x
To solve for x, we can rearrange the equation and combine like terms:
-95x + x = -70 + 14
-94x = -56
Next, we can divide both sides by -94 to isolate x:
x = -56/-94
Finally, we can simplify the fraction to get our answer:
x = 28/47
Therefore, the solution to the equation is x = 28/47.
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State where in the ty-plane the hypotheses of the Existence and Uniqueness Theorem are satisfied for the equation y'=(ycot(2t))/(t^2+y^2+1)
We can conclude that the hypotheses of the Existence and Uniqueness Theorem are satisfied in any rectangular region in the ty-plane that does not contain the curve t² + y² = -1.
Where in the ty-plane the hypotheses of the existence and uniqueness theorem are satisfiedThe Existence and Uniqueness Theorem for first-order ordinary differential equations states that if a differential equation of the form y' = f(t, y) satisfies the following conditions in some rectangular region in the ty-plane:
1. f(t, y) is continuous in the region.
2. f(t, y) satisfies a Lipschitz condition in y in the region, i.e., there exists a constant L > 0 such that |f(t, y₁) - f(t, y₂)| ≤ L|y₁ - y₂| for all t and y₁, y₂ in the region.
then there exists a unique solution to the differential equation that passes through any point in the region.
In the case of the differential equation y' = (y cot(2t)) / (t² + y² + 1), we have:
f(t, y) = (y cot(2t)) / (t² + y² + 1)
This function is continuous everywhere except at the points where t² + y² + 1 = 0, which is the curve t² + y² = -1 in the ty-plane. Since this curve is not included in any rectangular region, we can say that f(t, y) is continuous in any rectangular region in the ty-plane.
To check if f(t, y) satisfies a Lipschitz condition in y, we can take the partial derivative of f with respect to y and check if it is bounded in any rectangular region. We have:
∂f/∂y = cot(2t) / (t² + y² + 1) - (2y² cot(2t)) / (t² + y² + 1)²
Taking the absolute value and simplifying, we get:
|∂f/∂y| = |cot(2t) / (t² + y² + 1) - (2y² cot(2t)) / (t² + y² + 1)²|
= |cot(2t) / (t² + y² + 1)| * |1 - (2y² / (t² + y² + 1)))|
Since 0 ≤ (2y² / (t² + y² + 1)) ≤ 1 for all t and y, we have:
1/2 ≤ |1 - (2y² / (t² + y² + 1)))| ≤ 1
Also, cot(2t) is bounded in any rectangular region that does not contain the points where cot(2t) is undefined (i.e., where t = (k + 1/2)π for some integer k). Therefore, we can find a constant L > 0 such that |∂f/∂y| ≤ L for all t and y in any rectangular region that does not contain the curve t² + y² = -1.
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Solve the inequality |3x-2| ≤4
Simplify all fractions as much as possible. Express your answer as an integer or fraction, and not as a decimal. If the answer is a fraction, provide the answer as "a/b". Do not leave spaces between characters.
? ≤ x ≤ ?
The solution to inequality is -2/3 ≤ x ≤ 2. The value of x lies between -2/3 and 2.
What is inequality?
In Algebra, an inequality is a mathematical statement that uses the inequality symbol to illustrate the relationship between two expressions. An inequality symbol has non-equal expressions on both sides. It indicates that the expression on the left should be greater or less than the expression on the right, or vice versa. Literal inequalities are relationships between two algebraic expressions that are expressed using inequality symbols.
Given inequality is
|3x-2| ≤ 4
Applying the formula |x| ≤ a → -a ≤ x ≤ a:
-4 ≤ 3x-2 ≤ 4
Add 2 on both sides:
-4 + 2 ≤ 3x-2 + 2 ≤ 4 + 2
-2 ≤ 3x ≤ 6
Divide both sides by 3:
-2/3 ≤ x ≤ 2
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You have a credit card that has a balance of $3589.90 and a credit limit of $5000. How much is the balance over the acceptable debt ratio percentage?
The balance over the acceptable debt ratio is $1089.90.
What is debt ratio percentage?A debt ratio calculates a company's leverage by comparing its total debt to its total assets.
Although this ratio varies greatly between industries, capital-intensive enterprises typically have significantly larger debt ratios than other types of businesses.
Divide total debt by total assets to find a company's debt ratio.
A debt ratio of less than 100% signifies a corporation has more assets than debt, and a debt ratio of larger than 1.0 or 100% means the opposite.
According to some sources, the debt ratio is calculated by dividing all obligations by all assets.
Given that, credit card balance = $3,589.90
credit limit = $5,000
Debt Ratio percentage = 50% = 0.50
The balance over is given as
balance = Current Balance - (Credit Limit × 0.50 )
balance = 3589.90 - (5000 × 0.5)
balance = 3589.9 - 2500
balance = 1089.9
Hence, the balance over the acceptable debt ratio is $1089.90.
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write the equation of the line that goes through the point and has the given (4,1); slope=2 Write all final answers in slope-intercept form.
Answer: y = 2x - 7
Step-by-step explanation:
Slope-intercept form is y=mx+b
m = slopeb = y-interceptSubstitute variables with their given values.
y = 2x + b
In order to find the y-intercept, or b, we can plug the point provided, (4,1) , into y = 2x + b and solve for b.
1 = 2(4) + b
1 = 8 + b
-7 = b
Now we can put the y-intercept into the equation, and get y = 2x - 7 .
The relation between the time spent walking and the time spent canoeing on a 30 mile
trip if you walk at 4 mph and canoe at 7 mph. Write a constraint equation,
determine two solutions, and graph the equation and mark your solutions.
The two solutions are (1, 1/7) and (3.36, 1)
Time spent walking and canoeing.Assume that you spend some time walking (t<sub>w</sub>) and some time canoeing (t<sub>c</sub>) to cover a 30-mile trip. We can use the following formula to relate the time spent walking and canoeing:
distance = speed × time
For the walking part of the trip, the distance covered is (30 - d), where d is the distance covered by canoeing. We know that the walking speed is 4 mph, so we can write:
(30 - d) = 4t<sub>w</sub>
For the canoeing part of the trip, the distance covered is d. We know that the canoeing speed is 7 mph, so we can write:
d = 7t<sub>c</sub>
We also know that the total time spent on the trip is:
t<sub>w</sub> + t<sub>c</sub>
So, the constraint equation is:
t<sub>w</sub> + t<sub>c</sub> = 30/4 + 30/7
Simplifying this equation, we get:
11t<sub>w</sub> - 7t<sub>c</sub> = 30
Now, to determine two solutions, we can arbitrarily assign a value to one of the variables and then solve for the other. Let's assume t<sub>w</sub> = 1, then we get:
11(1) - 7t<sub>c</sub> = 30
7t<sub>c</sub> = 1
t<sub>c</sub> = 1/7
So, one solution is t<sub>w</sub> = 1 and t<sub>c</sub> = 1/7.
Similarly, assuming t<sub>c</sub> = 1, we get:
11t<sub>w</sub> - 7(1) = 30
11t<sub>w</sub> = 37
t<sub>w</sub> = 3.36
So, another solution is t<sub>w</sub> = 3.36 and t<sub>c</sub> = 1.
To graph the equation, we can plot t<sub>w</sub> on the x-axis and t<sub>c</sub> on the y-axis, and then plot the line 11t<sub>w</sub> - 7t<sub>c</sub> = 30. The two solutions will be the points of intersection of the line with the axes.
The two solutions are (1, 1/7) and (3.36, 1).
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Solve for x
2/5(2)^x = 32/5