Income tax is 5% on the first $50,000.00 of income or less, and 8% on any income in excess of $50,000.00. Let T(x) be a function of the income x.
Answers
To calculate the income tax T(x) based on the provided tax brackets for income x, we can define the function T(x) as follows:
1. If the income x is $50,000.00 or less, then the tax is 5% of the income.
2. If the income x is more than $50,000.00, then the tax is 5% on the first $50,000.00 plus 8% on the amount in excess of $50,000.0.
We can express this with a piecewise function:
T(x) = 0.05 * x, for x ≤ $50,000.00
T(x) = 0.05 * $50,000.00 + 0.08 * (x - $50,000.00), for x > $50,000.00
Let's break it down with an example calculation:
Example 1: If the income x is $40,000.00
Since the income is less than or equal to $50,000.00, we use the first part of the function:
T(x) = 0.05 * $40,000.00
T(x) = $2,000.00
So the income tax would be $2,000.00.
Example 2: If the income x is $60,000.00
Since the income is greater than $50,000.00, we use the second part of the function:
T(x) = 0.05 * $50,000.00 + 0.08 * ($60,000.00 - $50,000.00)
T(x) = $2,500.00 + 0.08 * $10,000.00
T(x) = $2,500.00 + $800.00
T(x) = $3,300.00
So the income tax would be $3,300.00.
This is how you would manually calculate the income tax for any given income using the function T(x) with the specified tax brackets.
Answer:
2Sales $1,120,000.00 $1,000,000.00
3 Cost of goods sold 971,250.00 875,000.00
4 Gross profit $148,750.00 $125,000.00
5 Selling expenses $71,250.00 $62,500.00
6 Administrative expenses 56,000.00 50,000.00
7 Total operating expenses $127,250.00 $112,500.00
8 Income before income tax $21,500.00 $12,500.00
9 Income tax expense 8,000.00 5,000.00
10 Net income $13,500.00 $7,500.00
Required: A. Prepare a comparative income statement with horizontal analysis for the two-year period, indicating the increase (decrease) for the current year when compared with the previous year. Use the minus sign to indicate an amount or percent decrease. If required, round percentages to one decimal place. B. What conclusions can be drawn from the horizontal analysis?
Step-by-step explanation:
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What is the solution to the equation 9(w-4)-7w=5(3w-2)
Hi, I need help with this equation x²+y²-4x-6x+9=0
What is the solution of 2=6p-8-5p?
What is RS?
4 feet
7 feet
10 feet
14 feet
Answers
Answer:
B. 7 feet
Step-by-step explanation:
Given:
NS = (x + 10) ft
SR = (x + 3) ft
Required:
RS
SOLUTION:
Based in the centroid theorem, the centroid, S will divide the median, line segment NR, into NS and SR, such that NS : SR = 2 : 1.
Therefore:
NS = 2(SR)
x + 10 = 2(x + 3) (substitution)
Solve for x
x + 10 = 2x + 6
Collect like terms
x - 2x = -10 + 6
-x = -4
divide both sides by -1
x = 4
SR = (x + 3) ft (SR is same as RS)
Plug in the value of x
SR = (4 + 3) ft
SR = RS = 7 ft
Answer:
i got b too
Step-by-step explanation:
Answers
12s - 20 < 50 - 3s - 25
+3s +3s
15s - 20 < 50 - 25
+ 20 + 20
15s < 70 - 25
15s < 45
÷ 15 ÷15
s < 3
The value of s is less than or equal to 3. So s can be 3, 2, 1, 0, and negative numbers.
s = 3 ⇒ 12(3) - 20 < 50 - 3(3) - 25 ; 36 - 20 < 50 - 9 - 25 ; 16 < 16
s = 2 ⇒ 12(2) - 20 < 50 - 3(2) - 25 ; 24 - 20 < 50 - 6 - 25 ; 4 < 19
The coin falls down with an average speed of 132.3 meters per second from 3 seconds to 6 seconds.
The coin falls down with an average speed of 44.1 meters per second from 3 seconds to 6 seconds.
The coin travels an average distance of 132.3 meters from 3 seconds to 6 seconds.
The coin travels an average distance of 44.1 meters from 3 seconds to 6 seconds.
Answers
change in time = 6 - 3 = 3
The object travels 132.3 meters in 3 seconds
the speed is the ratio of the two values
speed = distance/time
speed = 132.3/3
speed = 44.1 meters per second
This is the average speed of the object from t = 3 to t = 6 seconds. This is equivalent to the slope of the straight line through the two points.
The answer is The coin falls down with an average speed of 44.1 meters per second from 3 seconds to 6 seconds.`
Answers
Answer:
Step-by-step explanation:
You solve a question like this by finding the slope and intercept of the desired line and putting those values into the answer form.
__
The relationship between slopes of perpendicular lines is that one is the negative reciprocal of the other.
The slope-intercept form of the equation for a line is ...
y = mx + b . . . . . . where m is the slope and b is the y-intercept
The given line is in "slope-intercept form," so you can identify the slope as 4 and the y-intercept as 6. (For this question, the y-intercept of the given line is irrelevant.)
Using the relationship between slopes of perpendicular lines, you now know the slope of the line you want is m = -1/(slope of given line) = -1/4. This is the coefficient of x in the slope-intercept form, so fills the blanks on the left.
To make the line go through the point (1, 1), you need to choose a y-intercept that makes (x, y) = (1, 1) a solution to the equation. For a y-intercept of "b", that means ...
y = -1/4x + b
1 = -1/4·1 + b . . . . . . . . fill in the values of x and y at the given point
1 + 1/4 = b = 5/4 . . . . . add 1/4 to both sides of the equation
Now you know the equation you want is ...
Answers
what you do to get the answer is divide 14 by the total of your ratio 2+5=7 14 divided by 7=2 now you take each ratio piece and times it by the 2
B. all real number
C. all real numbers except 5
D. all positive real numbers
Answers
Answer:
Step-by-step explanation:
All Real Numbers