Answer: -5/6
Step-by-step explanation:
Hopefully this helps, my friend, best of luck to you :)
Simplify pleaseeee help I need to understand it
Answer:
hope this helps you a lot
I need the. answer asap
Answer:
(-7,2)
Step-by-step explanation:
Exo math 30 page 229
What is the area of the trapezoid?
________________________________
(reporting wrong/spam answers)
(giving brainliest to the correct answer)
________________________________
Answer:
144inch^2
Step-by-step explanation:
8×8=64
64÷2=32
10×8=80
80+32+32=144
Answer:
144 in
Step-by-step explanation:
Area of a trapezoid: the large base plus the small base multiplied by the height divided by two
small base:10 in
large base: 10+8+8=26
(10+26)×8 = 36×8 = 144 in
2 2
9. Use the expression 32.6 ÷ 10-5 x 8-9.16 to create an expression that includes
a set of parentheses so that the value of the expression is 43.10.
Use the expression 6.3 x 15 ÷ 3+ 6.8-28.09 to create an expression that
includes a set of parentheses so that the value of the expression is 46.25.
The first parentheses, (10-5), will calculate to 5. The second parentheses, (8-9.16), will calculate to -1.16.
The first parentheses, (3 + 6.8), will calculate to 9.8. The second parentheses, (6.3 x 15), will calculate to 94.
What are Parentheses?Parentheses are symbols used to group numbers or variables together, usually for the purpose of making calculations easier. Parentheses are commonly used to group numbers within an equation or expression and to indicate that certain operations should be performed before or after others. They are also used to clarify the meaning of a mathematical expression or to help identify the parts of an equation.
To create an expression with parentheses so that the value of the expression 32.6 ÷ 10-5 x 8-9.16 is 43.10, the following equation can be used: (32.6 ÷ (10-5)) x (8-9.16) = 43.10. The parentheses are used to ensure that the values within them are calculated first. The first parentheses, (10-5), will calculate to 5. The second parentheses, (8-9.16), will calculate to -1.16. Then the resulting equation will be 32.6 ÷ 5 x -1.16, which will equal -43.10.
To create an expression with parentheses so that the value of the expression 6.3 x 15 ÷ 3 + 6.8 - 28.09 is 46.25, the following equation can be used: (6.3 x 15) ÷ (3 + 6.8) - 28.09 = 46.25. The parentheses are used to ensure that the values within them are calculated first. The first parentheses, (3 + 6.8), will calculate to 9.8. The second parentheses, (6.3 x 15), will calculate to 94.
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What factor would you need to multiply by (3d+1) to get 9d^2 + 6d + 1
Answer:
To get 9d^2 + 6d + 1 from (3d+1), you would need to multiply by 3d+1 again.
Expanding (3d+1)(3d+1), you get:
9d^2 + 3d + 3d + 1
Simplifying, you get:
9d^2 + 6d + 1
Therefore, you need to multiply (3d+1) by (3d+1) or (3d+1)^2 to get 9d^2 + 6d + 1.
A magician makes potions by combining maple syrup from a magical maple tree with ordinary water. The magician starts with a large supply of two potions: a red potion, which is 60% magical syrup by volume (and the rest is just water), and a blue potion, which is 30% magical syrup by volume. (Perhaps you're wondering how the same syrup can produce both red and blue potions. That's why it's magic syrup!)
(a) Find the amount of red potion (in mL) that must be added to 500 mL of blue potion in order to produce a potion that is 40% magical syrup by volume.
(b) Find the amounts of red potion and blue potion (in mL) that can be combined in order to produce 100 mL of a potion that is 54% magical syrup by volume.
(c) Does there exist a combination of red potion and blue potion that can produce a potion that is 75% magical syrup by volume?
Taking the quantities by volume of each potion into consideration, we can respectively answer 250ml (A), 40 mL of red and 60 mL of blue potion (B), and no (C).
How to find the solutionFor question A: Let x be the amount of red potion (in mL) that must be added to 500 mL of blue potion to produce a potion that is 40% magical syrup by volume. The amount of magical syrup in the red potion is 0.6x, and the amount of magical syrup in the blue potion is 0.3(500) = 150. The total amount of syrup in the final mixture is 0.4(500 + x), and the amount of magical syrup in the final mixture is 0.4x + 150. We can set up the equation:
0.4x + 150 = 0.4(500 + x)
Solving for x, we get x = 250 mL. Therefore, 250 mL of red potion must be added to 500 mL of blue potion to produce a potion that is 40% magical syrup by volume.
For question B: Let x be the amount of red potion (in mL) and y be the amount of blue potion (in mL) that must be combined to produce 100 mL of a potion that is 54% magical syrup by volume. The amount of magical syrup in the red potion is 0.6x, and the amount of magical syrup in the blue potion is 0.3y. The total amount of syrup in the final mixture is x + y, and the amount of magical syrup in the final mixture is 0.6x + 0.3y. We can set up the equations:
x + y = 100 (equation 1)
0.6x + 0.3y = 0.54(100) (equation 2)
Solving for x and y, we get x = 40 mL and y = 60 mL. Therefore, 40 mL of red potion and 60 mL of blue potion must be combined to produce 100 mL of a potion that is 54% magical syrup by volume.
For question C: No, there does not exist a combination of red potion and blue potion that can produce a potion that is 75% magical syrup by volume. The amount of magical syrup in the red potion is 60%, which is more than twice the amount of magical syrup in the blue potion (30%). Therefore, any combination of the two potions will always have less than 60% magical syrup by volume.
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Use y = 4* to graph log4 x - 3
Therefore , the solution of the given problem of graphs comes out to be curve of y = 4x – 3 can be plot by y=4x graph.
A graph is what?Graphs are used by theoretical physicists to analytically and graphically display assertions rather than values. Typically, a graph coordinate point shows the relationship between several distinct objects. A graph is a particular kind of pas e carrier construction composed of groups and lines. The borders, also known as the channels, should be joined together with glue.
Here,
The methods below can be used to plot y = log4 x - 3 as a graph:
Move the y-axis of the graph of
=> y = log4 x down 3 units, making the horizontal asymptote y = -3 the new x-axis.
To acquire the graph of
=> y = log4 x – 3, reflect the resulting graph across the line y = x.
Here is a detailed explanation of how to plot y = log4 x - 3:
Diagram y equals 4x:
Plot the following y = 4x key locations first:
=> Y = 40 = 1 when x = 0.
=> If x = 1, then y = 41 = 4.
=> Y = 4-1 = 1/4 when x = -1.
The graph of y = 4x can be easily drawn using just these three values.
The curve of y = 4x is now 3 units lower:
To do this, take each y-coordinate and deduct 3 from it spots on the y = 4x graph. We now have the curve of y = 4x – 3:
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19. Money's value resides in the paper or metal from which it was made.
False
True
False. The value of money does not reside solely in the physical materials (paper or metal) from which it is made.
Explaining the concept of MoneyIn modern economies, money has value because it is widely accepted as a means of exchange for goods and services. The value of money is derived from the trust people have in its ability to facilitate transactions and store value over time.
The physical materials used to make money (paper or metal) are simply a medium of exchange that represent the value of the currency. The value of a currency can fluctuate based on a variety of factors such as inflation, interest rates, and global economic conditions.
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Lol please help me , cant get this right!!!
The solution of the quadratic equation x² + 10x -4 found using the quadratic formula is: x = -5 ± √29.
Explain about the quadratic formula?Sometimes, factoring the quadratic, setting its factor equal to zero, but then solving each factor is the quickest way to find the answer to "ax² + bx + c = 0" given the value of x.
Yet, there are situations when the quadratic is too complicated, it just doesn't factor in anyway, or you might not feel like factoring at all. The Quadratic Formula also can provide the solutions for you even when factoring sometimes isn't going to be successful.
The given equation:
x² + 10x -4
The general quadratic equation can be written as:
ax² + bx +c
Then, roots of the equation can be found using quadratic formula:
x = -b±√(b²-4ac))/(2a)
a = 1, b = 10 and c = -4
Put the values:
x = [ -10 ± √(10²- 4*1*(-4))]/ (2*1)
x = [ -10 ± √(100 + 16)]/ 2
x = [-10 ± √116] / 2
x = [-10 ± 2√29] / 2
x = -5 ± √29
Thus, the solution of the quadratic equation x² + 10x -4 found using the quadratic formula is: x = -5 ± √29.
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Find the equation of the ellipse
The equation of the ellipse whose vertices are at (-3, -7), and (-3, 5), and focus is at (-3, 1) is; [tex]\frac{(x + 3}{8}+\frac{(y -2}{9} = 1[/tex]
What is standard form of the equation of an ellipse?The equation of an ellipse can be presented as follows;
[tex]\frac{(x - h)^2}{b^2} + \frac{(y-k)^2}{a^2} = 1[/tex]
Where;
(h, k) = The coordinates of the center of the ellipse
a = The semi major axis
b = The semi minor axis
(h, k ± a) = The vertex coordinates
(h ± b, k) = The covertex coordinates
(h, k ± c) = The coordinates of the foci
c² = a² - b²
The vertex of the specified ellipse are; (-3, -1) and (-3, 5)
The focus = (-3, 1)
Therefore;
h = -3k + a = 5
k - a = -1
2·k = 4
k = 4/2 = 2
k = 2k + a = 5
2 + a = 5
a = 5 - 2 = 3
a = 3k - c = 1
2 - c = 1
-c = 1 - 2 = -1
-c = -1
c = 1
c² = a² - b²
Therefore;
1² = 3² - b²
b² = 3² - 1² = 8
b² = 8The equation of the ellipse is therefore;
[tex]\frac{(x - (-3))^2}{8} + \frac{(y-2)^2}{3^2} = \frac{(x + 3)^2}{8} + \frac{(y-2)^2}{9} = 1[/tex]Learn more on the equation of an ellipse here: https://brainly.com/question/27745454
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Marjorie teaches piano. The equation P = 35s models the
relation between her weekly profit, P, in dollars and the number
of student lessons, s, that she teaches.
a. Find Marjorie's profit for a week when she teaches no
student lessons.
b. Find the profit for a week when she teaches 20 student
lessons.
c. Interpret the slope and P-intercept of the equation.
W
Marjorie's profit for a week when she teaches no student lessons is $0. Marjorie's profit for a week when she teaches 20 student lessons is $700. The slope of the equation P = 35s is 35
How to calculate the Interpret the slope and P-intercept of the equation.a. To find Marjorie's profit for a week when she teaches no student lessons, we substitute s = 0 into the equation P = 35s:
P = 35(0) = 0
Therefore, Marjorie's profit for a week when she teaches no student lessons is $0.
b. To find the profit for a week when she teaches 20 student lessons, we substitute
s = 20 into the equation
P = 35s:
P = 35(20) = 700
Therefore, Marjorie's profit for a week when she teaches 20 student lessons is $700.
c. The slope of the equation P = 35s is 35. This means that for each additional student lesson Marjorie teaches, her profit increases by $35.
The P-intercept of the equation is 0, which represents the profit Marjorie makes when she does not teach any student lessons.
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8.2
#4
Quadrilateral LMQW is shown.
W
M
mzL-14x-10
mzM-23y-4
m/N - 6x + 22
IF LMNW is a parallelogram,
what is the value of x?
Type your answer as a whole number.
Answer:
Hi! x = 4
Step-by-step explanation:
the shape is a parallelogram!
so the opposite angles must be the same
therefore, you can equate angle L and angle N to find your x!
Hope this helps
The area of a plane shape is given by A=(10x-2)cm square. The area is not greater or equal to 12cm square. It is however not less than 2cm. Find the smallest possible area of this shape
Answer:
Step-by-step explanation:
We know that the area of the plane shape is given by A = (10x - 2) cm^2, and we also know that:
A is not greater than or equal to 12 cm^2 (i.e., A < 12), and
A is not less than 2 cm^2 (i.e., A > 2).
To find the smallest possible area of the shape, we need to find the smallest possible value of x that satisfies these conditions.
From the given conditions, we have:
10x - 2 < 12
10x < 14
x < 1.4
and
10x - 2 > 2
10x > 4
x > 0.4
Therefore, the smallest possible value of x that satisfies both conditions is:
0.4 < x < 1.4
To find the smallest possible area, we can substitute the lower bound of x into the area formula:
A = (10x - 2) cm^2
A = (10 × 0.4 - 2) cm^2
A = 2 cm^2
Therefore, the smallest possible area of the shape is 2 cm^2.
Answer this question and explain
Answer:
I’m pretty sure it’s Salma because hers is all positive na the graph is and the graph is in quadrant 1 which is all positive
In triangle PQR is equal to QR and angle R is equal to 50° then find the measure of Q
Answer:
Step-by-step explanation:
Since PQR is a triangle with QR = PQ, we have:
∠PQR = ∠QPR (since the angles opposite to equal sides are equal)
Let x be the measure of ∠QPR. Then:
∠PQR + ∠QPR + ∠R = 180° (sum of angles in a triangle)
x + x + 50° = 180°
2x = 130°
x = 65°
Therefore, the measure of ∠QPR is 65°.
What is the Value of X?
The value of x is found by using the similarity theorem to create a proportion of the sides of the similar triangle, such that: x = 6 cm.
How to Find the Value of x Using Similarity Theorem?Both triangles in the image above are similar to each other based on the AA similarity theorem, which states if two angles of one triangle are congruent to two angles of another triangle, then the triangles are similar. This means that the corresponding sides of the triangles are proportional.
Therefore, we will have:
x/42 = 4/28
Cross multiply:
28x = 168
x = 168/28
x = 6 cm
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b. Write a multiplication equation to show how the length is scaled. 4 This bar shows the length of 8 units scaled in a different way. a. Use words to describe how the length of 8 units is scaled. b. Write a multiplication equation to show how the length is scaled. 1s = 1 × Is X Use th Is 0 53 X Use the 0 Is ³/3 x
The length of the bar is doubled because it was stretched to twice the length of the original bar.
A multiplication equation that shows how the length is scaled is 2 × 8 = 16.
The length of the bar is halved because it was compressed to one-half the length of the original bar.
A multiplication equation that shows how the length is scaled is 1/2 × 8 = 4.
What is scale factor?In Mathematics and Geometry, the scale factor of a geometric figure can be calculated by dividing the length of the image (new figure) by the length of the pre-image (original figure):
Since the original bar has a length of 8 units, we can logically deduce that its length became doubled because it was expanded to twice the length of the original bar. Therefore, a multiplication equation to model this expansion is given by:
2 × 8 = 16.
Conversely, the original bar has a length of 4 units, we can logically deduce that its length was halved because it was shrunk to one-half the length of the original bar. Therefore, a multiplication equation to model this compression is given by:
1/2 × 8 = 4.
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4. A study by the Technology Services department revealed company employees receive
an average of two emails per hour. Assume the arrival of these emails is approximated
by the Poisson distribution. What is the probability that an employee received 5 or more
emails during the same period?
She received 5 or more emails in the same time period with a probability of 0.05265.
What is probability?Simply put, probability is the likelihood that something will occur.
When we don't know how an event will turn out, we can discuss the likelihood or likelihood of several outcomes.
Statistics is the study of events that follow a probability distribution.
The higher the likelihood, the more likely it is that the event will take place.
So, the probability would be:
We know that λ = 2.
The formula for the poisson distribution states:
P(x = x) = (λˣ * e^⁻ˣ) / x!
P(x = 1) = (2¹ *e⁻²) / 1!
P(x = 1) = (2 * 0.1353352) = 0.2706
Then,
P(x ≥ 5) = 1 - P(x < 5)
1 - P(x < 5) = 1 - [p(x = 0) + p(x = 1) + p(x = 2) + p(x = 3) + p(x = 4)]
We gather the individual probabilities and combine them. We can use a Poisson distribution calculator to speed up computations:
1 - P(x < 5) = 1 - (0.13534+0.27067+0.27067+0.18045+0.09022)
1 - P(x < 5) = 1 - 0.94735 = 0.05265
P(x ≥ 5) = 1 - P(x < 5) = 0.05265
Therefore, she received 5 or more emails in the same time period with a probability of 0.05265.
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Correct question:
An internal study by the Technology Services department at Lahey Electronics revealed company employees receive an average of two emails per hour. Assume the arrival of these emails is approximated by the Poisson distribution. What is the probability she received 5 or more emails during the same period?
Dirk and Steve both plan to run to a spot on the school board in their city. They must each collect a certain number of signatures to get their name on the ballot. So far, Dirk has 20 signatures, but Steve just started and doesn't have any yet. Kirk is collecting signatures at an average rate of 6 per hour, while Steve can get 10 signatures every hour. Assuming that their rate of collection stays the same, eventually the two will have collected the same number of signatures. How many hours will have gone by?
Answer: 2.5 hours
Step-by-step explanation:
Let's call the number of signatures that Steve needs to collect "x". We know that Dirk has 20 signatures, so he needs to collect "x - 20" more signatures to have the same number as Steve.
We can set up an equation to represent this:
6h + 20 = 10h + x - 20
Simplifying this equation, we get:
x = 4h + 40
So, Steve needs to collect 4 signatures more per hour than Dirk to eventually collect the same number of signatures. We can solve for "h", the number of hours it will take for them to have the same number of signatures:
6h + 20 = 10h + (4h + 40)
6h + 20 = 14h + 40
8h = 20
h = 2.5
So, it will take 2.5 hours for Dirk and Steve to have collected the same number of signatures.
willka can cover 13.5 m^2 with 3L of paint
Willka would need 6 liters of paint to cover an area of 27 square meters according to the ratio.
What is ratio?A ratio is a comparison of two or more values or quantities. It is a way of expressing the relationship between two or more quantities in a mathematical form. A ratio is typically expressed in the form of "a:b" or "a to b", where a and b are two values being compared.
According to question:
To find the coverage per liter of paint, we can divide the total area covered by the amount of paint used.
In this case, we can divide 13.5 m² by 3 L:
Coverage per liter = 13.5 m² / 3 L = 4.5 m²/L
This means that with 1 liter of paint, Willka can cover an area of 4.5 square meters.
If we know the area to be painted, we can use this ratio to determine how much paint is needed.
For example, if we want to paint an area of 27 square meters, we can calculate:
Paint needed = area to be painted / coverage per liter = 27 m² / 4.5 m²/L = 6 L
So Willka would need 6 liters of paint to cover an area of 27 square meters.
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18.75 in 3 significant figures
Answer:
18.8
Step-by-step explanation:
consider rounding off 7 that becomes 8
Answer:
18.8
Step-by-step explanation:
Yes...Thats the ans...
From the figure find x,y,z, a,b, and c
Let f(x)=x^2+3. Find F(2)
Answer:
7
Step-by-step explanation:
When you put a value for x in a function, it means that you substitute all terms of x for that value you just substitute for x=2. The x term in the function is x^2, so that squared would be 4. You then add 3, yielding a total result of 7.
Answer:
f(2) = 7
Step-by-step:
Solution :Let f(x)=x^2+3. Find f(2)
[tex] \begin{gathered}{\longrightarrow{f(x)= {x}^{2} +3}}\end{gathered}[/tex]
[tex] \begin{gathered}{\longrightarrow{f(2)= {(2)}^{2} +3}}\end{gathered}[/tex]
[tex] \begin{gathered}{\longrightarrow{f(2)= {(2 \times 2)}+3}}\end{gathered}[/tex]
[tex] \begin{gathered}{\longrightarrow{f(2)= {(4)}+3}}\end{gathered}[/tex]
[tex] \begin{gathered}{\longrightarrow{f(2)= 4+3}}\end{gathered}[/tex]
[tex]\begin{gathered}{\longrightarrow{\underline{\underline{f(2)= 7}}}}\end{gathered}[/tex]
Hence, the value of f(2) is 7.
————————————————What is the solution to the system of equations?
3 x minus 4 y = 16. 2 x + 3 y = 5.
Answer:
It's 5
Step-by-step explanation:
i tootk the test
Step-by-step explanation:
To solve the system of equations:
3x - 4y = 16
2x + 3y = 5
We can use either substitution or elimination method. Here, we will use the elimination method:
Multiply the second equation by 4 to get:
8x + 12y = 20
Now we can add this equation to the first equation:
3x - 4y + 8x + 12y = 16 + 20
Simplifying the left side and adding the right side, we get:
11x = 36
Dividing both sides by 11, we get:
x = 36/11
Substituting this value of x into the second equation, we get:
2(36/11) + 3y = 5
Multiplying through by 11 to eliminate the fraction, we get:
72/11 + 3y = 55/11
Subtracting 72/11 from both sides, we get:
3y = -17/11
Dividing both sides by 3, we get:
y = -17/33
Therefore, the solution to the system of equations is:
x = 36/11, y = -17/33
or in decimal form,
x ≈ 3.27, y ≈ -0.52
Nasim is flying a kite, holding his hands a distance of 2.5 feet above the ground and letting all the kite’s string play out. He measures the angle of elevation from his hand to the kite to be 28 degrees. If the string from the kite to his hand is 105 feet long, how many feet is the kite above the ground? Round your answer to the nearest hundredth of a foot if necessary.
Please help!
Answer: The height of Nasim's kite above the ground is 51.79 feet
Step-by-step explanation
Let h represent the height from Nasim hand to the kite, hence:
sin(28) = h / 105
h = 49.29
Kite height above the ground = 2.5 + 49.29 = 51.79 feet
The height of Nasim's kite above the ground is 51.79 feet
Answer:
The height of Nasim kite above the ground is 51.79 feet
What is an equation?
An equation is an expression that shows the relationship between two or more numbers and variables.
Let h represent the height from Nasim hand to the kite, hence:
sin(28) = h / 105
h = 49.29
Kite height above the ground = 2.5 + 49.29 = 51.79 feet
The height of Nasim kite above the ground is 51.79 feet
2) The subtotal of your computer purchase was $398.50. If the sales tax rate is 7.25%, how much will you pay in tax for the computer?
The sale tax fοr the cοmputer is $28.89.
What is sale tax?A sales tax is a fee that is paid tο the gοvernment when certain gοοds and services are sοld. Typically, laws permit the seller tο charge the custοmer the tax at the time οf purchase. It is typically referred tο as a use tax when a tax οn gοοds οr services is paid directly tο a gοverning bοdy by a cοnsumer.
Yοur cοmputer purchase cοst $398.50 in tοtal. The sales tax is 7.25 percent.
The sale tax = cοst οf the prοduct × pecentage οf tax
Sales tax = 398.50 × 7.25%
Cοnvert percentages intο fractiοns:
Sales tax = 398.50 × (7.25/100)
Sales tax = 28.89125
sales tax ≈ 28.89
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Find 2 × 2 2 1/5. 1 1 1/5 [][][][] 1 1 1/5 [][][][] A. 2 2/5 B. 4 1/5 C. 4 2/5 D. 5
The solution of the arithmetic expression is 4 2/5.
option C.
what is arithmetic expression?An arithmetic expression is a combination of numbers, operators (such as addition, subtraction, multiplication, and division), and parentheses, which are used to indicate the order of operations. Arithmetic expressions can be evaluated or simplified using the rules of arithmetic, which specify how the various operations should be performed.
We can solve this arithmetic expression by performing the multiplication operation first and then adding the results.
(2 x 2) + (2 x 1/5)
= 4 + 2/5
= 20/5 + 2/5
= (20 + 2) / 5
= 22/5
= 4 2/5
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The complete question is below:
Find 2 × 2 + 2 1/5 = ?
A. 2 2/5
B. 4 1/5
C. 4 2/5
D. 5
A worker's annual income is £3,000 if the first £500 is tax free and on the remaining amount tax is paid at the rate of 5 penny per pound; find the total tax paid by the man. A. £125 B. £150 C. £175 D. £350 E. £650
Answer:
The taxable income is £3000 - £500 = £2500.
The tax paid at the rate of 5 penny per pound is:
0.05 x £2500 = £125
Therefore, the total tax paid by the man is £125. Answer: A. £125
Step-by-step explanation:
Given that a function, g, has a domain of -20 ≤ x ≤ 5 and a range of -5 ≤ g(x) ≤ 45 and that g(0) = -2 and g(-9) = 6, select the statement that could be true for g. A. g(-4) = -11 B. g(0) = 2 C. g(7) = -1 D. g(-13) = 20
The statement that could be true for g is D. g(-13) = 20.
What statement could be true?
We are given that the function g has a domain of -20 ≤ x ≤ 5 and a range of -5 ≤ g(x) ≤ 45, and we also know that g(0) = -2 and g(-9) = 6.
We can use this information to eliminate the statements that are not true and find the one that could be true for g.
A. g(-4) = -11: Since the range of g(x) is between -5 and 45, and g(-4) is less than -5, this statement cannot be true.B. g(0) = 2: We are given that g(0) = -2, so this statement is not true.C. g(7) = -1: 7 is outside the domain of g(x), so we cannot determine the value of g(7).D. g(-13) = 20: Since g(-9) = 6 and the range of g(x) is between -5 and 45, we can see that g(x) increases as x decreases.Therefore, g(-13) is greater than g(-9) and could be 20, so this statement could be true.
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