Examples of 'equal to x' in a sentence
Meaning of "equal to x"
Equal to x: This phrase is used in mathematical contexts to indicate that two expressions are of the same value
How to use "equal to x" in a sentence
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equal to x
So x squared over y squared is equal to x over y squared.
Is equal to x of t times the unit vector in the x direction.
Rounds x to closest integer less than or equal to x.
So then we get this is equal to x times x plus x times y.
We know that the corresponding angle is equal to x.
The equation is z is equal to x squared plus xy plus y squared.
We could also write it as y squared is equal to x squared.
And you get y is equal to x times the natural.
So we can rewrite this as a to the y power is equal to x.
So we say cosine of theta is equal to x over the hypotenuse.
Is a smooth function of compact support which is equal to x.
Log of x to the x as being equal to x times the natural log of x.
Rounds x to the closest integer greater than or equal to x.
So making it y minus k is equal to x squared shifted it up by k.
Returns the largest integer smaller than or equal to x.
See also
Which is just equal to x squared.
Is equal to x to the power abc.
And let me say that b is equal to x over y.
This is equal to x to the third.
So this curve right there is y is equal to x squared.
And that should be equal to x to the third plus x squared y.
You have dealt with f of x is equal to x squared.
And you get y is equal to x times the natural log of x plus c.
So let us first just graph y is equal to x squared.
This is equal to x dot x.
Because the function is f of x is equal to x squared.
Let us say that f of x is equal to x to the absolute value of x to the fifth.
Now let me draw the function y is equal to x squared.
Or y is equal to x squared.
We just evaluated when x is equal to x plus h.
If f of x is equal to x to the fifth, then the derivative is.
This is the curve of f of x is equal to x squared.
That 's equal to x minus f squared plus y squared.
So our upper bound is y is equal to x squared.
So its volume is equal to x times x times x, or x to the third.
See how it relates to y is equal to x squared.
This is equal to x squared minus 2 times xy plus y squared.
You would have w is equal to x minus v.
The second line shows U computing the corresponding public key h by setting it equal to x v.
Well y is obviously equal to x squared.
Multiply both sides by B and you get B sine of alpha is equal to x.
The sum of their squares is going to be equal to x squared plus y squared.
Is equal to x times x, is equal to x squared.
So we are going to stick with f of x is equal to x squared.
So this is equal to x squared.
The cosine of theta is equal to x.
So let us say that f of x y is equal to x squared plus x times y plus y squared.
A bit of a classic implicit differentiation problem is the problem y is equal to x to the x.
This is y is equal to x squared.
Let us think about what the curve of y minus k is equal to x squared.
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Equal remuneration for work of equal value
Everyone shall be equal before the law
Equal opportunities shall be provided for everybody
