Created by Dominique TREMULOT
over 1 year ago
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A linear /ˈlɪniə(r)/ function
The function ln
A one-to-one function
The edges of the domain (of a function)
What is the input value for which \(f(x)=0\)?
Remplacer \(x\) par 0
The range of a function
The graph of \(f\) passes through \((1-0)\)
The slope
The slope of a line passing through the points \((x_1- y_1)\) and \((x_2- y_2)\) is
A line with a positive slope \((m > 0)\)
A line with a negative slope \((m < 0)\)
The slope intercept form of a linear function
The point-slope form of the equation of a straight line
The slope-intercept form of the equation of a straight line
The inverse function of \(f\)
\(\displaystyle\lim_{x\to\infty} f(x)\)
To sketch the graph of \(f\)
To graph the function \(f\)
The function \(f\) is differentiable /dɪfə'renʃieɪbl/ on \(\mathbb{R}\)
To differentiate /dɪfəˈrenʃieɪt/ the function \(f\)
\(f'\) est la dérivée de la fonction \(f\)
\(y'=\dfrac{\text{d} y}{\text{d} x}\) is the derivative /dɪˈrɪvətɪv/ of \(y\) with respect to \(x\)
\(f'(2)\) est la dérivée de \(f\) en 2
\(f''\) est la dérivée seconde de \(f\)
\(f'(x)\)
\(f''(x)\)
If \(y=f(x)\)- \(y\) is called
If \(y=f(x)\)- \(y\) is called- \(x\) is called
When talking about limits- \(0\cdot \infty\) is called
Sketch the graph of the function \(f\)
A piecewise function (or a piecewise-defined function)
A constant piecewise function
To graph a function
The function that assigns to each nonnegative integer its last digit
The function is concave /kɒnˈkeɪv/ up/the function is convex
The function is concave /kɒnˈkeɪv/ down
The difference quotient of \(f\) is the average rate of change of \(f(x)\) over the interval \([x-x+h]\)
A limit exists if and only if
An invertible /ɪnˈvɜːtəbəl/ function
If \(f\) is an invertible /ɪnˈvɜːtəbəl/ function
The graph of \(y=x^{1/n}\) is obtained
\(\csc(x)\)
\(\sec(x)\)
\(\cot(x)\)
If \(f(x)\) is continuous at \(x=a\)
The greatest integer function is denoted by \(\lfloor x\rfloor\)
A bounded function
An anti-derivative of the function \(f\)