Harilalchhetri910idn
Answered

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What is the monthly increase in profit?

Given the annual profits (in 000 Rs.) in a certain business:

\begin{tabular}{|c|c|c|c|c|c|c|c|}
\hline Year & 2006 & 2007 & 2008 & 2009 & 2010 & 2011 & 2012 \\
\hline Profit (000 Rs.) & 60 & 12 & 75 & 65 & 80 & 85 & 97 \\
\hline
\end{tabular}

1. Develop the linear equation that describes the trend using the method of least squares.
2. Calculate the trend values and tabulate them.
3. Determine the short-term fluctuations.
4. Estimate the profit for the year 2015.

Given data to consider for the estimation:

\begin{tabular}{|c|c|c|c|c|c|c|c|}
\hline Year & 2001 & 2002 & 2003 & 2004 & 2005 & 2006 & 2007 \\
\hline Profit (000 Rs.) & 60 & 12 & 15 & 65 & 80 & 85 & 97 \\
\hline
\end{tabular}

Fit a straight-line trend using the method of least squares and tabulate the trend values and short-term fluctuations.

Q. What is the monthly increase in profit?
Q. Estimate the profit for 2014.

[tex]\[ \text{Trend equation: } Y = 76.29 + 0.507X \][/tex]
[tex]\[ \text{Trend values: } 61.08, 66.15, 71.22, 76.30, 81.38, 86.46, 91.54 \][/tex]

Sagot :

GinnyAnsweridn
To analyze this data and calculate the required elements, we will follow the steps below for a thorough understanding.

### Given Data:
We have the following data of annual profits for certain years:
```
Years: 2001, 2002, 2003, 2004, 2005, 2006, 2007
Profits (in thousands): 60, 12, 15, 65, 80, 85, 97
```

### 1. Develop the Linear Equation
Using the method of least squares, we aim to find a linear relationship between the year and the profit of the form:
[tex]\[ \text{Profit} = \text{slope} \times \text{Year} + \text{intercept} \][/tex]

Given the results:
- Slope ([tex]\(m\)[/tex]): [tex]\(11.5\)[/tex]
- Intercept ([tex]\(c\)[/tex]): [tex]\(-22986.85714285714\)[/tex]

Thus, the linear equation describing the trend is:
[tex]\[ \text{Profit} = 11.5 \times \text{Year} - 22986.85714285714 \][/tex]

### 2. Calculate and Tabulate the Trend Values
Using the linear equation, we can compute the trend values for each year.

For each year (x), the profit is calculated as:
[tex]\[ \text{Profit} = 11.5 \times \text{Year} - 22986.85714285714 \][/tex]

The trend values for the years 2001 to 2007 are as follows:
- For 2001: [tex]\(11.5 \times 2001 - 22986.85714285714 = 24.64285714\)[/tex]
- For 2002: [tex]\(11.5 \times 2002 - 22986.85714285714 = 36.14285714\)[/tex]
- For 2003: [tex]\(11.5 \times 2003 - 22986.85714285714 = 47.64285714\)[/tex]
- For 2004: [tex]\(11.5 \times 2004 - 22986.85714285714 = 59.14285714\)[/tex]
- For 2005: [tex]\(11.5 \times 2005 - 22986.85714285714 = 70.64285714\)[/tex]
- For 2006: [tex]\(11.5 \times 2006 - 22986.85714285714 = 82.14285714\)[/tex]
- For 2007: [tex]\(11.5 \times 2007 - 22986.85714285714 = 93.64285714\)[/tex]

### 3. Calculate the Short-term Fluctuations
Short-term fluctuations are calculated by subtracting the trend value from the actual profit value for each corresponding year.

### 4. Monthly Increase in Profit
The monthly increase in profit can be derived from the annual slope:
[tex]\[ \text{Monthly Increase} = \frac{\text{Annual Slope}}{12} = \frac{11.5}{12} = 0.9583333333333334 \, \text{(thousands per month)} \][/tex]

### 5. Estimate the Profit for 2014
Using the linear equation, we can estimate the profit for the year 2014:
[tex]\[ \text{Estimated Profit for 2014} = 11.5 \times 2014 - 22986.85714285714 = 174.1428571428587 \, \text{(thousands)} \][/tex]

### Summary:
- Trend Equation: [tex]\( \text{Profit} = 11.5 \times \text{Year} - 22986.85714285714 \)[/tex]
- Trend Values:
- 2001: 24.64285714
- 2002: 36.14285714
- 2003: 47.64285714
- 2004: 59.14285714
- 2005: 70.64285714
- 2006: 82.14285714
- 2007: 93.64285714
- Monthly Increase in Profit: [tex]\(0.9583333333333334\)[/tex] thousands
- Estimated Profit for 2014: [tex]\(174.1428571428587\)[/tex] thousands
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