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Kettering University

Kettering University is a university in Flint, Michigan, offering degrees in engineering, math, science, and business. The campus is located along the Flint River on property that used to be the main manufacturing location for General Motors. It is named after inventor and former head of research for General Motors Charles Kettering.

More information: http://en.wikipedia.org/wiki/Kettering_University

IE-331: Industrial Engineering Statistics II Spring 2000 WEEK 1

IE-331: Industrial Engineering Statistics II Spring 2000 WEEK 1

Dr. Srinivas R. Chakravarthy Professor of Operations Research and Statistics Kettering University (GMI Engineering & Management Institute) Flint, MI 48504-4898 Phone: 810.762.7906 Email: schakrav@kettering.edu Homepage: www.kettering.edu/~schakrav
MATH408: Probability & Statistics Summer 1999 WEEK 1

MATH408: Probability & Statistics Summer 1999 WEEK 1

Dr. Srinivas R. Chakravarthy Professor of Mathematics and Statistics Kettering University (GMI Engineering & Management Institute) Flint, MI 48504-4898 Phone: 810.762.7906 Email: schakrav@kettering.edu Homepage: www.kettering.edu/~schakrav
MATH408: Probability & Statistics Summer 1999 WEEK 2

MATH408: Probability & Statistics Summer 1999 WEEK 2

Dr. Srinivas R. Chakravarthy Professor of Mathematics and Statistics Kettering University (GMI Engineering & Management Institute) Flint, MI 48504-4898 Phone: 810.762.7906 Email: schakrav@kettering.edu Homepage: www.kettering.edu/~schakrav
MATH408: Probability & Statistics Summer 1999 WEEKS 8 & 9

MATH408: Probability & Statistics Summer 1999 WEEKS 8 & 9

Dr. Srinivas R. Chakravarthy Professor of Mathematics and Statistics Kettering University (GMI Engineering & Management Institute) Flint, MI 48504-4898 Phone: 810.762.7906 Email: schakrav@kettering.edu Homepage: www.kettering.edu/~schakrav
MATH408: Probability & Statistics Summer 1999 WEEK 6

MATH408: Probability & Statistics Summer 1999 WEEK 6

Dr. Srinivas R. Chakravarthy Professor of Mathematics and Statistics Kettering University (GMI Engineering & Management Institute) Flint, MI 48504-4898 Phone: 810.762.7906 Email: schakrav@kettering.edu Homepage: www.kettering.edu/~schakrav

Learning About Learning Center For Excellence in Teaching and Learning Kettering University October 2, 2001
Kettering University Environmental Scanning Electron Microscopy Laboratory

Kettering University Environmental Scanning Electron Microscopy Laboratory

Contact Yuri Sikorski at 810-762-7908 or ysikorsk@kettering.edu
Numerical study of the blade cooling effect generated by multiple jets issuing at different angles and speed into a compressible horizontal cross flow. MECH 523 Applied CFD Sagar Kapadia

Numerical study of the blade cooling effect generated by multiple jets issuing at different angles and speed into a compressible horizontal cross flow. MECH 523 Applied CFD Sagar Kapadia

Definition Why do we study it ? Is the Behavior system based or nodal based? What are the real time applications How do we calculate these values What are the applications and applicable areas A lot many definitions and new way of looking at the things Matrix theories and spaces : an overview Introduction
A Project Presentation for Applied Computational Fluid Dynamics By Reni Raju

A Project Presentation for Applied Computational Fluid Dynamics By Reni Raju

Finite Element Model of Gas Flow inside a Microchannel MECH - 523

Continuum Mechanics On the scale of the object to be studied the density and other fluid properties will vary smoothly from one point to another Gas at normal pressure and low pressure Perfect fluid Newtonian fluid Shear forces are linearly proportional to velocity gradients Basic concepts

ANGLE MODULATION Generalized angle and instantaneous frequency : PHASE MODULATION (PM) , FREQUENCY MODULATION (FM) Consider the generalized angle PHASE MODULATOR m(t) FM(t) FREQUENCY MODULATOR m(t) PM(t) We can generate FM signal using a PM system, and PM signal using a FM system.

Let g(t) be periodic; period = To . Fundamental frequency = fo = 1/ To Hz or o = 2/ To rad/sec. Harmonics =n fo , n =2,3 4, . . . Trigonometric forms Communication Systems : Prof. Ravi Warrier EXAMPLE : g(t) 0.2 -0.2 0.6 1 -0.6 -1 0 t a) For R = 1 M and C=1 µF , what is go(t) ? b) For R = 1 M and C=0.1 µF , what is go(t) ? 2 FOURIER SERIES
MATH408: Probability & Statistics Summer 1999 WEEK 4

MATH408: Probability & Statistics Summer 1999 WEEK 4

Dr. Srinivas R. Chakravarthy Professor of Mathematics and Statistics Kettering University (GMI Engineering & Management Institute) Flint, MI 48504-4898 Phone: 810.762.7906 Email: schakrav@kettering.edu Homepage: www.kettering.edu/~schakrav
MATH408: Probability & Statistics Summer 1999 WEEK 3

MATH408: Probability & Statistics Summer 1999 WEEK 3

Dr. Srinivas R. Chakravarthy Professor of Mathematics and Statistics Kettering University (GMI Engineering & Management Institute) Flint, MI 48504-4898 Phone: 810.762.7906 Email: schakrav@kettering.edu Homepage: www.kettering.edu/~schakrav
MATH408: Probability & Statistics Summer 1999 WEEK 7

MATH408: Probability & Statistics Summer 1999 WEEK 7

Dr. Srinivas R. Chakravarthy Professor of Mathematics and Statistics Kettering University (GMI Engineering & Management Institute) Flint, MI 48504-4898 Phone: 810.762.7906 Email: schakrav@kettering.edu Homepage: www.kettering.edu/~schakrav
MATH408: Probability & Statistics Summer 1999 WEEKS 10 & 11

MATH408: Probability & Statistics Summer 1999 WEEKS 10 & 11

Dr. Srinivas R. Chakravarthy Professor of Mathematics and Statistics Kettering University (GMI Engineering & Management Institute) Flint, MI 48504-4898 Phone: 810.762.7906 Email: schakrav@kettering.edu Homepage: www.kettering.edu/~schakrav
MATH408: Probability & Statistics Summer 1999 WEEK 5

MATH408: Probability & Statistics Summer 1999 WEEK 5

Dr. Srinivas R. Chakravarthy Professor of Mathematics and Statistics Kettering University (GMI Engineering & Management Institute) Flint, MI 48504-4898 Phone: 810.762.7906 Email: schakrav@kettering.edu Homepage: www.kettering.edu/~schakrav

AMPLITUDE MODULATION Main Topics : Double sideband modulation, demodulation Amplitude Modulation - Suppressed carrier Single sideband Vestigial Sideband Superhetrodyne AM Receiver AMPLITUDE MODULATION : DOUBLE SIDEBAND SUPPRESSED CARRIER(DSB-SC) m(t) = message signal , M()= its spectrum , cos(ct) =carrier signal, c =carrier frequency. (t) = m(t)cos(ct) = modulated signal, EXAMPLE : 0 0 Upper sideband (USB) Lower sideband (LSB) 0 Notice that the carrier part is missing in the spectrum of (t) (impulse functions disappeared). Therefore, this type of modulation is called AM-Double Side band Suppressed Carrier (AM-DSBSC) modulation. Communication Systems : Prof. Ravi Warrier
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