So they have to run or they are both doomed. But, the d/dy treats them equally like dirt beneath its feet, and can take them both out with a single blow. So, in the meme, e x is initially confident because it knows that d/dx can't change it, and it's strong enough to carry the constant along with it and keep it from being sent to 0. The derivative of a constant is 0, so taking d/dy of ce x kills it completely and gives us 0. There is no y on the right hand side of this expression so, as far as y is concerned (in other words, with respect to y), it is a constant function. However, if you take the derivative with respect to y (using d/dy as the differentiation symbol) things are different. In other words, this function is its own slope at every point, which is pretty cool. When you take the derivative of f(x)=ce x (with c being a constant - just a number) with respect to x (so using d/dx as the differentiation symbol), it doesn't change you get dy/dx=f'(x)=ce x. Upload new template Popular My Thanos Simple Calculus Blank View All Meme Templates (1,000s more. Hopefully that answers at least some of your questions! Thanos Simple Calculus Meme Generator The Fastest Meme Generator on the Planet. I'd recommend looking this one up as it gets a little complicated, but the gist of it is that even though dy/dx is a symbol, not a fraction, you can separate the dy and dx to two different functions to represent how the x value changes with one function and how the y value changes with another (keep in mind, y is dependant on x, so there must be some relationship where you can just write the changes independently rather than as a ratio like the normal derivative). The second part of your question is about separation of variables. And that's what the derivative is - how does y change with respect to x at any point (i.e. It should be noted that this isn't just a simple fraction - the "dy/dx" dont refer to specific values of x and y, but rather "an infinitesimally small step of y at a point" and "an infinitesimally small step of x at a point". Essentially, dy/dx simply means "how is y changing with respect to how x is changing over infinitesimally small values across the function?". He believed notations was incredibly important in helping mathematicians understand and create new theorems. With respect to given 'potentials' (a 'vector potential' $A$ and scalar potential $\varphi$), the electric field, or basically, the value at each point in space of the force of the particle divided by charge, or, sticking a charge in space, allows one via the equation $F=qE$ (q is the charge of the particle) to calculate the force on the particle.D/dx is Leibniz notation. This gives rise to the energy released via fusion. This is basically the $E=mc^2$ which describes the energy of the system being in a manner 'equivalent to energy'. This formula describes the total energy of a system with rest mass, or the mass of the object at rest, $m$, and momentum $p$, where $c$ is the speed of light. This describes, with respect to another inertial frame traveling at a velocity $v$ ($\beta=v/c$), where $c$ is the transmission velocity of light in a local inertial frame, in a vacuum, the time relative to you of the observer moving. This is the Pythagorean theorem, and corresponds to the right triangle labeled above. However, here is a partial transcription, equation by equation: I don't think anyone has tried to identify these equations from the film, so I'm pleased that the OP here actually cares what was written over the Byonce photograph! I spent nearly 20 hours covering every square inch of the bathroom shower walls with genuine equations and graphs actually related to the solid-state physics discussed by the main character. I was a consultant on the movie Raising Genius about a high-school science genius who locks himself in a bathroom and covers the walls with equations. Thank you Dont forget to confirm subscription in your email. Relation between electric field and electric potentials in electrodynamicsĪs a personal aside, I was responsible for something closely related to this list.Coordinate transformation in special relativity.Thank you brave cops, this world would be terrible without you. Legendre transformation between Lagrangian and Hamiltonian in theoretical mechanics 133 Posts - See Instagram photos and videos from Calculus Memes (calculusmemes).Time evolution of a Heisenberg operator in quantum mechanics.Raising and lowering operators for quantum angular momentum. Differential cross section to the scattering amplitude in scattering theory (thanks to Raising operator for the quantum harmonic oscillator.Area under a Gaussian (Normal distribution).
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