Online TA Profiles
Sujith P, PhD (IP)
OTA ID#: 105377
| Education Experience: |
BSc, Mathematics, Mahatma Gandhi University, 2001 MSc, Statistics, Mahatma Gandhi University, 2003 |
|---|---|
| Focus of Study: | I am doing a PhD in the Department of Statistics, CUSAT |
| Awards: | First Rank in B.Sc (Mathematics) and Second Rank in M.Sc (Statistics) |
| Work Experience: | One year of research experience |
| Skills & Achievements: | Qualified Joint CSIR-UGC Junior Research Fellowship |
| Career Interests: | To Become a Good Teacher |
| Outside Interests: | Listening to Music |
| Message to Students and/or Parents: |
Work hard, then only look for help |
| Postings Answered: | 88 |
| Cumulative OTA Rating: | 5/5 What is OTA Rating? |
- Mathematics - Please show me how to solve
- Statistics: Pittsburgh crimes, tylenol, aerospace parts factory, US Mint, watch springs - 1. Classify as independent or dependent samples: The number of crimes committed in Pittsburgh, and the number of crimes committed in Los Angeles. 2. Classify as independent or dependent samples: Th ...
- Mathmatica - Using Mathmatica 6 set up and run the following: please show the answers in PDF format...note Mathmatica must be used prefer 6 but can accept 5.2 a) The built in function Prime[n], outputs ...
- Probability - During the period of time phone-in reservations are being taken at a local university, calls come in at a rate of one every ten minutes. a. What is the expected number of calls in one hour? b. ...
- Discrete Structures Question - See attached 7. Let D = days of the week {M, T, W, R, F}, E = {Brian (B), Jim (J), Karen (K)} be the employees of a tutoring center at a University and let U = {Courses the tutoring center needs t ...
- BEHIND THE SUPPLY CURVE : INPUTS AND COSTS - See attachment.
- Chi-Squared Probability Distribution - Please see the attached file for the fully formatted problems.
- Probability: Prove that X^2 + Y^2 and X/Y are independent - See attached file for clarity. Let X and Y be independent standard normal variables. Prove that X^2 + Y^2 and X/Y are independent.
- Statistics Probability: Non-negative integer values - See attached file for clarity. If X takes non-negative integer values show that E[X] = Sigma (n=0 to ∞) P(X>n)
- Proving Trigonometric Identities - 1. Prove that cotx/(1+tan(-x)) + tanx/(1+cot(-x)) = cotx+tanx+1 2. Prove that (sinx+tanx)/(1+secx) = sinx
- Mean Testing - The average height of a particular plant is known to be 78 cms. The average height of 20 plants to which a particular manure was applied was found to be 85 cms. Assuming the heights are distributed no ...
- Proving that f is not uniformly continuous - The following theorem could be used to write the proof. A theorem states that if d:D-->R is uniformly continuous on D iff the following condition is satisfied: If un and vn are both sequences in D ...
- Primitive numbers - Assume that n is odd and a is a primitive root mod n. Let b be an integer with b ≡ a(mod n) and gcd (b, 2n) =1. Show that b is a primitive root mod 2n.
- First Order IVP - First Order IVP. See attached file for full problem description.
- Real Analysis - Banach Fixed Point Theorem - Prove the following generalization of the Banach Fixed Point Theorem: If T is a transformation of a complete metric space X into itself such that the nth iterate, T^n, is a contraction for some positi ...
- Show that a rule is a metric - Show that a rule is a metric. See attached file for full problem description.
- Error function - Initial Value Problem. See attached file for full problem description.
- Ordinary Differential Equation - Solve a second order differential equation with RHS equal to zero. See attached file for full problem description.
- Monotone Convergence Theorem - Monotone Convergence Theorem. See attached file for full problem description.
- Second Derivative - Second Derivative. See attached file for full problem description.
