Answer:
A. rate of growth of a seedling over two weeks
Step-by-step explanation:
The answer is option A - rate of growth of a seedling over two weeks.
The data that can be best represented by a line chart is a linear relationship or time series data.
This type of data shows how something changes over a long or short period of time.
So, the best possible answer is A. rate of growth of a seedling over two weeks.
A.
Square ABCD is rotated 270° clockwise and then dilated by a scale factor of 1/3 to form square AꞌꞌBꞌꞌCꞌꞌDꞌꞌ.
B.
Square ABCD is reflected across the x-axis and then dilated by a scale factor of 2 to form square AꞌꞌBꞌꞌCꞌꞌDꞌꞌ.
C.
Square ABCD is dilated by a scale factor of 4/5 and then translated 1 unit right to form square AꞌꞌBꞌꞌCꞌꞌDꞌꞌ.
D.
Square ABCD is translated 8 units right and 8 units up and then reflected across the y-axis to form square AꞌꞌBꞌꞌCꞌꞌDꞌꞌ.
Answer:
In the small intestine more digestive enzymes act on the food. Pancreatic juice, from the pancreas, and bile, produced in the liver and stored in the gall bladder, continue to break down various parts of the food. They complete the digestion of starches, sugars, and fats. I hope tis helps
Step-by-step explanation:
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: