Which of the following is an equation of a sine function with maximum value of 3, minimum value of 1, and period of ($$ \frac { 2 } { 3 } $$? A: f(x) = 1 + sin 6xB: f(x) = 1 + sin 6πxC: f(x) = 2 + sin 3πxD: f(x) = 2 sin 3x 相关知识点: 试题来源...
Write the equation of a sine function that has amplitude 4 and period 6. (No phase shift and no vertical shift) Write the equation of the cosine function with an amplitude of \frac{1}{3}, a period of 2 \pi, \text{ and a phase shif...
Additive functionabelian groupgroup charactercosine functional equationfunctional equation with restricted argumentsinvolutionmultiplicative functionsine functional equationLet G be an abelian group, \\({\\mathbb{C}}\\) be the field of complex numbers, \\({\\alpha \\in G}\\) be any fixed element...
sinh Hyperbolic sine (sinh) of a value or expression cosh Hyperbolic cosine (cosh) of a value or expression tanh Hyperbolic tangent (tanh) of a value or expression exp e (Euler's number) raised to the power of a value or expression ln The natural logarithm of a value or expression log...
百度试题 结果1 题目Find a sine equation for the function where the amplitude is positive.相关知识点: 试题来源: 解析 y=2.5 sin x+1.5 反馈 收藏
The equation involves a sine function, which means the argument of the sine function must be dimensionless. This means that the terms inside the sine function must have the same dimensions. Step 2: Identify the termsIn the expression xv−k, we have:- x: This represents displacement.- v:...
The equations that describe the x position, x velocity and x acceleration of this point describe the motion of a simple harmonic oscillator. Using x(t) for position as a function of time, v(t) for velocity as a function of time and ...
Inverse Function:An inverse of a parent function can be determined by exchanging the function variables and then writing a new expression of the function. The inverse function is a type of function whose domain becomes the range of the parent function and ...
We survey our work on a function generalizing 2F12F1. This function is a joint eigenfunction of four Askey–Wilson-type hyperbolic difference operators, reducing to the Askey–Wilson polynomials for certain discrete values of the variables. It is defined by a contour integral generalizing the ...
To find the dimension of k in the wave equation Y=Asin(ω(xv)−k), we need to analyze the terms inside the sine function. Step 1: Understand the terms in the equationThe argument of the sine function must be dimensionless. Therefore, the term ω(xv)−k must also be dimensionless....