Multi variable calculus

As a Calc 1 student this doesnt make any sense

Game_Ender

It is the (accumulated) length travelled over time (a to b) of an entity moving along a curve in 3D space.
The entity’s x, y, z position is a function of time.

erickappel

In its simplest trajectory =sqrt(a^2+b^2)

goblin

Vector calculus expanded. Root vector v squared integrated from time a to time b. His is the forward approach, mine is the backward!

dougr.

I thought it was gonna be a parametric equation until he added dz 😭

wizardman

Funny how Pythagoras shows up everywhere, not just in school level maths.

colinjava

Looks like arc length on the surface of a volume.
Shouldn't the limits be t1-t2 instead of a-b though?

NH_RSA__

You have successfully struck the fear into my heart by writing the square root😂

xiaoqixi

Is it arc length when parametric form is used??

djjdjd

I can pull out the *dt* from the root.. easily see its nothing but length of an arc in 3D

K_V-S

kind of like a line integral without the function... what is bprp up to?

lemmonlemon

Brother I’m only a geometry student, blud exploded my brain, like how the flip u differentiate a function you don’t know

terrariariley

It depends on what the limits a and b are representing.
Two ways of considering it:
1.
Let x, y and z the coordinates of a point M in space with respect to an ortho- normal coordinating system with origin O, so is
L=||OM|| =sqrt(x^2 + y^2 + z^2), the norm/magnitue of vector OM, i.e., the length of vector OM
=> dL=d(|OM||) =sqrt(dx^2 + dy^2 + dz^2)
=>∫[√(…)]dt = ∫[dL/|dt|]dt
=> ∫[√(…)]dt = sign(dt) ∫dL

Assuming the point M describes a travel trajectory T of an object over time t, and a and b represent the position on the trajectory f at two different times t1 and t2, t1<t2, then
dt>0, and
∫[√(…)]dt = ∫dL = travel distance along trajectory T from a to b

In the simplest case of linear trajectory
=> ∫[√(…)]dt = (b-a)

2. Alternatively:
Assuming the point M=(x(t), y(t), z(t)) describes a trajectory T of an object traveling with a speed V(t)=[vx(t), vy(t), vz(t)] and a and b represent the positions on the trajectory T at two different times t1 and t2, t1<t2, then
vx(t)=dx/dt
vy(t)=dy/dt
vz(t)=dz/dt
=>
√[(dx/dt)^2 + (dy/dt)^2 + (dz/dt)^2] = ||V(t)||
=> [√(…)]dt = ||V(t)||dt is the travel distance dL during the travel time dt
=> ∫[√(…)]dt = ∫dLdt, is the travel distance from a to b along the trajectory T

antonyqueen

when most of the math problem is letters💀

mondevens

looks like some 3rd dimensions arc length idk

warguy

Jeopardy:
i'll take box 3, Alex, 4 $200.
what is the length of the curve x(t), y(t), z(t) from t=a to t=b.

benshapiro

He is integrating in the respect to t but there is no t?? So its all constants? I don't get it

Matyanson

The integral makes sense indeed. But the video doesn't. What does he explain? What is the use? What is his purpose with this video?

henkhu

Arc length formula for three dimensions?

shadowfax

area of a surface? idk yet future me whats the answer

jaycubes