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What does the word associative property of addition mean?
The order of the 3 numbers won't affect the product. Example: a+b+c=b+a+c* * * * *WRONG!The associative property states that the order in which the operation (of addition) is carried out does not matter.So, (a + b) + c = a + (b + c) and so either can be written as a + b + c without ambiguity.To change the order of the summands required commutativity.For example:Multiplication is also associative and, in the case of matrices,(A * B) * C = A * (B * C) = A * B * CBut B * A need not even exist!Associative property states that the change in grouping of three or more addends or factors does not change their sum or product.
What is the difference between mean value theorem of integration and Mean Value Theorem of differentiation?
The mean value theorem for differentiation guarantees the existing of a number c in an interval (a,b) where a function f is continuous such that the derivative at c (the instantiuous rate of change at c) equals the average rate of change over that interval. mean value theorem of integration guarantees the existing of a number c in an interval (a,b)where a function f is continuous such that the (value of the function at c) multiplied by the length of the interval (b-a) equals the value of a the definite integral from a to b. In other words, it guarantees the existing of a rectangle (whose base is the length of the interval b-a that has exactly the same area of the region under the graph of the function f (betweeen a and b).
What does C mean in LCM?
The C stands for Common.
A change in temperature of 450 C corresponds to a change in Fahrenheit of?
The forumla for F -> C is, (F-32)*5/9 So C->F is, (C*9/5)+32 C=450 F=(450*9/5)+32 = 842 F
Does a change in one variable cause a change in anther variable?
Supplemental: If there are different variables on two sides of an equation, a change in either variable will inevitably change the variable on the other side to make the equation true. Example: A + B = C, where A = 5 and B = 6, C = 12. If A = 7 and B = 6, C changes to 13. As you can see, changing A to 7 from 5 changed C, but not B. The good rule of thumb being, if one side changes, the other side does as well. -Jonathan C. Holcomb _____________________________________________________________________________ I don't know in what context are you talking about. But if you apply this question to everything you know the anser is NO. A change in a certain variable does not implies a change in another one. This does not mean that some variables are not affected by others, but the statement cannot be applied to every variable.
