Examples of 'is equal to f' in a sentence
Meaning of "is equal to f"
{"a": "is equal to f: Mathematical equation stating that the value or expression on one side is equivalent to the value 'F'.",
How to use "is equal to f" in a sentence
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is equal to f
And we are saying that y is equal to f of x in this context.
So is equal to f prime of c.
We could say now that y is equal to f inverse of x.
This is equal to f prime of x.
I kind of just assumed that y is equal to f of x.
This is y is equal to f of x right here.
So the unique solution to the equation f of x is equal to f of a is equal to a.
This is equal to f of b minus f of a.
We can say that s is equal to f inverse.
Y is equal to f of t.
And c times x plus d times y is equal to f.
So this is equal to f of t.
I said look if I have the equation f of x is equal to f of a.
This is equal to F of s.
The length of hB is equal to f.
See also
We can say that s is equal to f inverse . So f is definitely invertible.
And I am going to say that this is equal to f prime of x.
This is equal to f of x of b over y of b -- let me make sure.
So that is y is equal to f of x.
EPMATHMARKEREP The cardiac frequency hr i at the instant t i is equal to f i.
This is true for any x. g of x is equal to f of x is equal to f of x plus 1.
And let us say that this is f of x, or this is y is equal to f of x.
This is equal to f prime of x. Don't take my word on it on Lagrange.
Well, this is the curve of y is equal to f of x.
So is equal to f prime of c. I shouldn't have written it here.
So that 's the coordinate if you imagine that y is equal to f of x.
That is equal to f of minus 2 squared plus f of minus 2 plus 2.
So the derivative of this function evaluated at c, is equal to f prime of c.
So y is equal to f of x, is equal to 2x plus 4.
During the first step of this series of steps, the frequency f i is equal to f min.
I will do it in the same color -- this is equal to f inverse as a function of y.
During the last step of this series of steps, the frequency f i is equal to f max.
I could say, y is equal to f of x.
So to think about that, let us just define -- let us just say y is equal to f of x.
Let me switch back to the yellow -- is equal to f of x g of x minus this term.
You take the antiderivative of the inside, that's just f. So this is equal to f of t.
This right here, that is equal to f of 2 . Same idea.
F 3 is equal to F 2, which corresponds to a state of equilibrium.
What is the outside function? f of y, x is equal to f of y.
So this is the relationship . g of x is equal to f of x minus 2.
When x is 0, f of x or y -- I could even write over here, I could say, y is equal to f of x.
And I will say, y is equal to f of x.
And I am going to go over here and, of course, y is equal to f of x.
Well, the polynomial would become p of x is equal to f of 0 plus f prime of 0 x.
So let us think about this . g of negative 1 is equal to f of negative 3.
Let us say that big f prime of x is equal to f of x, right?
Maybe I should call it my f of x-axis . y is equal to f of x.
And actually I could say, this is the y is equal to f of x-axis.
Well, I could just set p of x is equal to f of 0.
First of all, let us confirm that p of 0 is equal to f of 0.
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