Examples of 'equal to c' in a sentence
Meaning of "equal to c"
equal to c: This phrase typically denotes an equivalence or similarity to the letter 'C' in the context of mathematics, physics, or other fields where variables or constants are compared or equated
How to use "equal to c" in a sentence
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equal to c
So this is equal to c squared times the transformation of a.
And you get x dot v is equal to c times v dot v.
So we have y squared minus x squared is equal to c.
It should be equal to c times v dot w.
So we know that a squared plus b squared is equal to c squared.
Area is equal to c squared.
The conjugate of c plus d i is equal to c minus d i.
So e is equal to c minus d.
And we would know that a solution is psi is equal to c.
Checking that the value thus obtained is equal to c if the signature is authentic.
And we know a solution of our original differential equation is psi is equal to c.
So the area here is equal to c squared.
But observations are consistent with the hypotenuse of the triangle being just equal to c.
And then you are left with a is equal to c times d c inverse.
We are required to cut off from AB a straight line equal to C.
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So this is just going to be equal to c squared minus d i squared . d i squared.
So you get ax plus by is equal to c.
This is equal to c times the transformation T applied to the transformation T-inverse applied to a.
So a squared plus b squared is equal to c squared.
This is equal to c squared a1 squared and this is equal to 0.
So the d that we are looking for is going to be equal to c inverse times a times c.
So it 's going to be zero everywhere, except something interesting happens at t is equal to c.
This is also equal to c.
So, the way I have drawn it this function is not defined when x is equal to c.
We just solved for d, so side e is equal to c minus b cosine of theta.
So, a solution to the differential equation is psi is equal to c.
So my a equals b is equal to c is equal to 0.
So you take the principal root of both sides and you get 5 is equal to C.
This is equal to c squared times the vector a1 squared 0.
So this must be equal to c.
Well this is just equal to c times the magnitude of y -- the length of y squared.
B is moreover preferably equal to c.
Well this is just equal to c times the magnitude of y-- the.
Or you could say, the conjugate of c minus d i is equal to c plus d i.
This is just equal to c times, this right here, is a projection of a onto L.
If this is a linear transformation then this should be equal to c times the transformation of a.
Expansion consists in shifting the quantity ( 1+m ) by a number of binary places equal to c.
And that is going to be equal to C squared.
The estimated phase of the central sample indexed 0, at the instant t, is simply equal to c.
So it 's going to be equal to c squared.
In this example, however, we know that v is very nearly equal to c.
And, of course, that is equal to c times Ax.
It can be shown that this is ( under certain assumptions ) always equal to c.
OK, case is equal to c cartons.
So, from this relation we can find that Lambda is equal to C over f.
If COUNT is greater than or equal to C control is passed to step 53.
And we know that a plus -- let me scroll down a little bit b is equal to c.
So we get 3 squared plus 4 squared is equal to C squared, where C is our hypotenuse.
And then at c, you jump, and the point c is included x is equal to c here.
So turns out that B is equal to C times the square root of 2 over 2.
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Everyone shall be equal before the law
Equal opportunities shall be provided for everybody
