Examples of 'e to the minus' in a sentence
Meaning of "e to the minus"
E to the minus: This likely refers to a mathematical concept involving the exponential function e raised to the negative power
How to use "e to the minus" in a sentence
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e to the minus
This right here is e to the minus st times f of t.
So e to the minus sc f of c times my delta function t minus c dt.
So this is going to be equal to e to the minus lambda.
E to the minus a big positive number is zero.
So let us factor out an e to the minus st.
And an e to the minus googolplex is an even smaller number.
Then u is equal to minus 1 over s e to the minus st.
So e to the minus cs times f of c.
This is going to be e to the minus sc times f of c.
So let us make v prime is f prime, and let us make u e to the minus st.
And I wrote e to the minus mu xi is cosine minus mu x plus i sine minus mu x.
Essentially, we are just evaluating e to the minus st evaluated at c.
Times e to the minus lambda, divided by r factorial.
Times x times second e to the minus x divided by 2.
So plus e to the minus 2x times the derivative of the second expression.
See also
Notice that g is something times e to the minus 2x.
This is f of t. e to the minus st times f of t dt.
That then, must be equal to e to the minus.
E to the minus of that term approaches zero ; one over one equals one.
So y is equal to minus e to the minus st over s, sine of at.
It was a minus here, but I am factoring out of a minus e to the minus st.
And then we had this e to the minus 2s this entire time.
Actually, let us factor out a negative e to the minus st.
So times 10 e to the minus x squared plus y squared plus z squared.
So now we can get rid of the e to the minus 2x terms.
So it 's e to the minus st over minus s.
This expression right here is equal to 2 times our F of s times e to the minus 2s.
So we get y is equal to minus e to the minus st over s, sine of at.
So if a is equal to minus 3, this is the Laplace Transform of e to the minus 3t.
Minus a over s squared, e to the minus st, cosine of at.
And now, we have uv prime, so u is minus 1 over s e to the minus st.
We have this e to the minus 2 pi s.
And I am also going to factor out the e to the minus 2x.
So then this e to the minus infinity approaches 0, so this term approaches 0.
This is the Laplace Transform of e to the minus 3t.
So I factor out an e to the minus st here, so it 's plus.
So they say y1 of x is equal to e to the minus 3x.
Times e to the minus 2s times F of s.
If I just multiply that times that, I essentially get e to the minus sc times f of c.
So we get nine e to the minus 3x, plus 2y prime.
Plus c2 times e to the lambda x, times e to the minus mu xi.
So that 's minus 1 over s e to the minus st, times v, sine of at, minus the integral.
We took the integral with respect to t. e to the minus sA, right?
So then you get minus e to the minus 2 pi s over 3 times 1 over s squared plus 1.
And g prime prime, we can factor out an e to the minus 2x.
And that 's just minus 2z times 10 e to the minus x squared plus y squared plus z squared.
So that 's just the derivative of the outside, e to the minus 3x.
But if I factor out a minus e to the minus st, this becomes a plus, right?
It 's the limit as A approaches infinity, of minus A / s, e to the minus sA.
So what 's anti-derivative of e to the minus st with respect to dt?
