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What are the inputs of the following function -3 2 -4 2 8 3 7 1?
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∙ 6y ago
{(-3, 2), (-4, 2), (8, 3), (7, 1)}
Wiki User
∙ 6y ago
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What is 1 plus 1 in synergy method?
According to synergy, 1 plus 1 > 2. Mathematically, it is nonsense, but it conveys the idea that there can be interactions between the two inputs so that the output is greater than what could be achieved by the two inputs operating separately.
How many number of inputs and outputs will a full adder will have?
3 inputs and 2 outputs
What is the function for this function table x -3 -2 0 1 2 y 9 4 0 1 4?
Y = x2
What is a mapping diagram in maths?
It is like a flow chart for a function, showing the inputs and the outputs. Eg. A mapping diagram for f(2x) would be: 1 ----> 2 2 ----> 4 3 ----> 6 etc. Sometimes the numbers are placed out of order so that the lines will cross. Good Luck! Mark Ravenwood Folkestone School for Girls
What is the trigonometric function sec?
The function sec(x) is the secant function. It is related to the other functions by the expression 1/cos(x). It is not the inverse cosine or arccosine, it is one over the cosine function. Ex. cos(pi/4)= sqrt(2)/2 therefore secant is sec(pi/4)= 1/sqrt(2)/2 or 2/sqrt(2).
What are different ways in representing function?
If you mean what are the various ways of representing a function? Then I'd suggest you ponder over the definition of a function at first. I think of functions as abstract entities that accept inputs and give a single output for every such input. Going off of this definition, various ways of representing a function are: 1) Explicit formula: This relates the output of a function to the input. i.e it tells you what exactly the function does to the input. eg. f(x) = x +2 tells you the function adds 2 to the input value. 2) The graph of a function: This gives you a good idea of how the function behaves in it's entire domain (the set of inputs for which the output is defined and real). 3) A table of inputs and outputs. 4) Verbal description of a function
An equation of a nonlinear function and provide two inputs to evaluate?
y=x2+3 x1=1 x2=2 y(x1) = 1*1+3 = 4 y(x2) = 2*2+3 = 7 x2/x1 = 2, While y2/y1 = 7/4 !=2, and thus the function is nonlinear.
What is a AND circuit?
An AND circuit is a circuit that takes two or more inputs, and generates an output that is the boolean AND function of those inputs. Two light switches in series, for instance, is an AND circuit because both switches have to be on for the light to be on. If the switches were wired in parallel to each other, and then in series with the light, that would be an OR circuit.
Are these numbers a function -2 -7 3 -5 6 -4 9 -6 10 -1?
No, they are just a string of unrelated numbers. A function is a mapping between inputs and outputs that meet some simple requirements.
What is the basic function of IC mc74hc132n?
That package contains four 2-input NAND gates with Schmitt-trigger inputs.
How would you determine from a list of ordered pairs whether it is a function?
When the value of one variable is related to the value of a second variable, we have a relation. A relation is the correspondence between two sets. If x and y are two elements in these sets and if a relation exists between xand y, then we say that x corresponds to y or that y depends on x, and we write x→y. For example the equation y = 2x + 1 shows a relation between x and y. It says that if we take some numbers x multiply each of them by 2 and then add 1, we obtain the corresponding value of y. In this sense, xserves as the input to the relation and y is the output. A function is a special of relation in which each input corresponds to a single (only one) output.Ordered pairs can be used to represent x→y as (x, y).Let determine whether a relation represents a function. For example:1) {(1, 2), (2, 5), (3, 7)}. This relation is a function because there are not ordered pairs with the same firstelement and different second elements. In other words, for different inputs we have different outputs. and the output must verify that when the account is wrong2) {(1, 2), (5, 2), (6, 10)}. This relation is a function because there are not ordered pairs with the same firstelement and different second elements. Even though here we have 2 as the same output of two inputs, 1 and 5, this relation is still a function because it is very important that these inputs, 1 an 5, are different inputs.3) {(1, 2), (1, 4), (3, 5)}. This relation is nota function because there are two ordered pairs, (1, 2) and (1, 4) with the same first element but different secondelements. In other words, for the same inputs we must have the same outputs. of a but
Is the function of nerve tissue?
Please let me know the answers of the following wuestions: 1. What is Nerve? 2. What are its Functions?
Factors that influence the elasticity of supply?
1. Flexibility of inputs 2. Mobility of inputs 3. Availability to produce substitutes 4. Time
What is the set of all possible outputs values of a function?
The input to a function need not be a number, it can be any well defined object. For example, a function might associate the letter A with the number 1, the letter B with the number 2, and so on. If the inputs and outputs are numbers, then the most obvious examples are the polynomials. f(x) = x + 1 is a simple example, a function that adds one to the input. f(1) = 1 + 1 = 2, f(2) = 2 + 1 = 3. Also, g(x) = 2x is a function that doubles the input. g(3) = 6, g(4) = 8. Another example is h(x) = 2x + 1. This doubles the output, and adds 1. The result is that h(1) = 2*1 + 1 = 3, h(2) = 2*2 + 1 = 5. i(x) = x is another function that does nothing to x. So i(1) = 1, i(2) = 2. f(x)=x^3+14x^2+63x+90 x=-6 Finding root using the Factor Theorem
Is 1 -2 a function?
1-2 is not a function because there is no defined function, such as f(n)=0n+1-2. Also, it does not contain a variable.
How can you differentiate between a function and an equation?
The idea of a function is that when you give it an input number, it will always give you a unique output number. Examples: y = 2x (y is a function of x) h = 1/x2 + 5 (h is a function of x) z = 23 + 3y - x + x/y (z is a function of x and y) An equation simply tells you that two things are equal (left side is equal to the right side). Examples: y = 2x (note: also a function) 2x2 + 5 = 50 (not a function, but can be manipulated to become one: [x = squareroot of (50 - 5)/2]) 2 + 19 = 21 (not a function) All functions are equations, but not all equations are functions. Any equation where you have 1 input but more than 1 output is a relation. A function can have different inputs that give the same output, but not 1 input and multiple outputs (example: If you put 5 and -5 as inputs into the function y = x2, you will get the same output of 25.)
When a function contains points how do you find inverse of the points?
Suppose a function f(.) is defined in the following way: f(1) = 3 f(2) = 10 f(3) = 1 We could write this function as the set { (1,3), (2, 10), (3,1) }. The inverse of f(.), let me call it g(.) can be given by: g(3) = 1 g(10) = 2 g(1) = 3
