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What is a second degree polynomial function?
A second-degree polynomial function is a function of the form: P(x) = ax2 + bx + cWhere a ≠ 0.
What is the function of a mathematical root?
The roots of a function are the points at which the value of the function is is zero. Also known as the "solutions" (i.e., the solutions to the equation, function = 0).
Use five 0 to make 120 by using any mathematical operator.?
(0! + 0! +0! + 0! + 0!)!
What is the polynomial of degree 0?
A polynomial of degree 0 is a polynomial without any variables, such as 9.
How can you find the intervals in which the mathematical functions are strictly increasing or decreasing?
You take the derivative of the function, then solve the inequality:derivative > 0 for increasing, orderivative < 0 for decreasing.
Are there no real solutions if a quadratic function is 0?
If a quadratic function is 0 for any value of the variable, then that value is a solution.
What is a mathematical fact?
A mathematical fact is any fact which can be proven mathematically. Examples: 1 + 1 = 2 0 / 1 is undefined The limit of 1/n as n approaches 0 is infinity.
Why tangent 360 degree is equal to zero?
The tangent function is a periodic function with period 180 degrees sotan(360) = tan(360-2*180) = tan(0) = 0.
Mathematical function table h equals 7g?
Input (g) Output (h) 0 0 1 7 2 14 3 21 ...and so forth.
Is it possible for a fourth degree function to have an inverse that is a function?
In order for a fourth degree function to have an inverse function, its domain must be restricted. Otherwise the inverse function will not pass the vertical-line test.Ex.f(x) = x^4 (x>0), the original functionf-1(x) = x ^ (1/4), the inverse
Use 5 0s and any mathematical operators to get 120?
The trick is that zero factorial (0!) equals 1[1], so (0!+0!+0!+0!+0!)! = 5! = 120
What is the mathematical definition and properties of the double delta function?
The double delta function, denoted as (x), is a mathematical function that is zero everywhere except at x 0, where it is infinite. It is used in signal processing and mathematics to represent impulses or spikes in a system. The properties of the double delta function include symmetry, scaling, and the sifting property, which allows it to act as a filter for specific frequencies in a signal.
