Cyclic Groups
... is trivial, then H is cyclic. Suppose H is not trivial. Let m be the smallest positive integer with am in H. (Does m exist?) ________ By closure, is contained in H.
...
... is trivial, then H is cyclic. Suppose H is not trivial. Let m be the smallest positive integer with am in H. (Does m exist?) ________ By closure,
To add fractions, the denominators must be equal
... To add fractions, the denominators must be equal. (If the fractions already have common denominators, then skip step #1.) To add fractions: 1. Rewrite each fraction so they each have a common denominator. Do this by multiplying each fraction by a form of 1 ( 33 , for example). To determine what the ...
... To add fractions, the denominators must be equal. (If the fractions already have common denominators, then skip step #1.) To add fractions: 1. Rewrite each fraction so they each have a common denominator. Do this by multiplying each fraction by a form of 1 ( 33 , for example). To determine what the ...
Chapter 3 - Eric Tuzin Math 4371 Portfolio
... Exercise. Explain why every power of an odd integer must also be an odd integer. First using the Fundamental Theorem of Arithmetic. All factors of an odd integer must also be odd integers. Therefore, if you raise an odd integer to a power n, it would multiply that odd integer times itself n times. S ...
... Exercise. Explain why every power of an odd integer must also be an odd integer. First using the Fundamental Theorem of Arithmetic. All factors of an odd integer must also be odd integers. Therefore, if you raise an odd integer to a power n, it would multiply that odd integer times itself n times. S ...
Rules for Counting Significant Figures
... estimated digit. Round the final answer to the place value of this estimated digit. If all number have decimal values the limiting term is the one with the smallest number of decimal places. Ex: ...
... estimated digit. Round the final answer to the place value of this estimated digit. If all number have decimal values the limiting term is the one with the smallest number of decimal places. Ex: ...
significant digits worksheet
... certainty of our measurement. There are three significant digits in All three digits are significant. this case (20.7). Thus, significant digits in a measurement or calculation consist of all those digits that are certain, plus one uncertain digit. Although your calculator may give you an answer to ...
... certainty of our measurement. There are three significant digits in All three digits are significant. this case (20.7). Thus, significant digits in a measurement or calculation consist of all those digits that are certain, plus one uncertain digit. Although your calculator may give you an answer to ...
Lab E4: B-field of a Solenoid
... voltage or current, including our DMM’s, display rms values. In this lab, you will be reading the voltage directly from the oscilloscope screen, so you should indicate whether you are reporting the amplitude or peak-to-peak voltage. It would be nice if we could use our DMM’s to measure the AC voltag ...
... voltage or current, including our DMM’s, display rms values. In this lab, you will be reading the voltage directly from the oscilloscope screen, so you should indicate whether you are reporting the amplitude or peak-to-peak voltage. It would be nice if we could use our DMM’s to measure the AC voltag ...
PDF
... In this entry, we will use the criterion of the parent entry to determine the first few even abundant numbers. To keep things more managable, we shall take advantage of the fact that a multiple of an abundant number is abundant and only look for abundant numbers none of whose proper divisors are abu ...
... In this entry, we will use the criterion of the parent entry to determine the first few even abundant numbers. To keep things more managable, we shall take advantage of the fact that a multiple of an abundant number is abundant and only look for abundant numbers none of whose proper divisors are abu ...
Mathematics of radio engineering
The mathematics of radio engineering is the mathematical description by complex analysis of the electromagnetic theory applied to radio. Waves have been studied since ancient times and many different techniques have developed of which the most useful idea is the superposition principle which apply to radio waves. The Huygen's principle, which says that each wavefront creates an infinite number of new wavefronts that can be added, is the base for this analysis.