List of top Applied Mathematics Questions

Fit a straight-line trend by the method of least squares for the following data:

\[ \begin{array}{|c|c|c|c|c|c|c|c|} \hline \textbf{Year} & 2004 & 2005 & 2006 & 2007 & 2008 & 2009 & 2010 \\ \hline \textbf{Profit (₹ 000)} & 114 & 130 & 126 & 144 & 138 & 156 & 164 \\ \hline \end{array} \]

Tabulate the trend values of the years and compute the expected sales trend for the year 2002.

Determine the equation of the straight-line trend.

When observed over a long period of time, a time series data can predict trends that can forecast increase, decrease, or stagnation of a variable under consideration. The table below shows the sale of an item in a district during 1996–2001:

\[ \begin{array}{|c|c|c|c|c|c|c|} \hline \textbf{Year} & 1996 & 1997 & 1998 & 1999 & 2000 & 2001 \\ \hline \textbf{Sales (in lakh ₹)} & 6.5 & 5.3 & 4.3 & 6.1 & 5.6 & 7.8 \\ \hline \end{array} \]

If \( R_1 \) is the feasible region, then find the maximum value of the objective function \( z = 5x + 2y \).

If \( R_2 \) is the feasible region, then what are the other two non-trivial constraints?

If \( R_1 \) is the feasible region, then what are the other two non-trivial constraints?

What are the two trivial constraints?

In number theory, it is often important to find factors of an integer \( N \). The number \( N \) has two trivial factors, namely 1 and \( N \). Any other factor, if it exists, is called a non-trivial factor of \( N \). Naresh has plotted a graph of some constraints (linear inequations) with points \( A(0, 50) \), \( B(20, 40) \), \( C(50, 100) \), \( D(0, 200) \), and \( E(100, 0) \). This graph is constructed using three non-trivial constraints and two trivial constraints. One of the non-trivial constraints is \( x + 2y \geq 100 \).

Based on the above information, answer the following questions:

Determine the values of \( x \) and \( y \).

Find the inverse of matrix \( A \).

Write the system of linear equations, obtained in (i) above, in matrix form \( AX = B \).

Write the system of linear equations in \( x \) and \( y \) formed from the given situation.

On her birthday, Prema decides to donate some money to children of an orphanage home.

If there are 8 children less, everyone gets ₹ 10 more. However, if there are 16 children more, everyone gets ₹ 10 less. Let the number of children in the orphanage home be \( x \) and the amount to be donated to each child be \( y \).

Based on the above information, answer the following questions:

A river near a small town floods and overflows twice in every 10 years on an average. Assuming that the Poisson distribution is appropriate, what is the mean expectation? Also, calculate the probability of 3 or less overflows and floods in a 10-year interval.
[Given \( e^{-2} = 0.13534 \)]

Determine the probability that the student studied for at most 2 hours.

Determine the probability that the student studied for at least 2 hours.

Find the value of \( k \).

Let \( X \) denote the number of hours a Class 12 student studies during a randomly selected school day. The probability that \( X \) can take the values \( x_i \), for an unknown constant \( k \):

\[ P(X = x_i) = \begin{cases} 0.1, & {if } x_i = 0, \\ kx_i, & {if } x_i = 1 { or } 2, \\ k(5 - x_i), & {if } x_i = 3 { or } 4. \end{cases} \]

Find the intervals in which the following function \( f(x) \) is strictly increasing or strictly decreasing: \[ f(x) = 20 - 9x + 6x^2 - x^3. \]

Find all the points of local maxima and local minima of the function: \[ f(x) = -\frac{3}{4}x^4 - 8x^3 - \frac{45}{2}x^2 + 105. \]

A cistern has three pipes A, B, and C. Pipes A and B are inlet pipes, whereas C is an outlet pipe. Pipes A and B can fill the cistern separately in 3 hours and 4 hours respectively, while pipe C can empty the completely filled cistern in 1 hour. If the pipes A, B, and C are opened in order at 5, 6, and 7 a.m. respectively, at what time will the cistern be empty?

Quarterly.

Semi-annually.

Find the effective rate which is equivalent to a normal rate of 10% p.a. compounded:

Given:

\[ (1.05)^2 = 1.1025, \quad (1.025)^4 = 1.1038. \]