Questions for someone who knows a lot about math

[Mike_Yates]

My math skills do not exceed basic arithmetic. So I have a few questions for somebody who knows a lot about mathematics.

*What do the letters mean in algebraic expressions?

*What do the strange symbols in calculus stand for?

http://www.infobarrel.com/media/image/18523.png

*What are algebra, geometry, trigonometry, and calculus used for?

 

[garbage can]

*What are algebra, geometry, trigonometry, and calculus used for?

Generally to figure out the volume (in cubic inches) of a mans cock, at full erection..............

 

[DevilishTexan]

Nought + nought = nought

 

[unregistered]

 

[Bert Notorius]

When something breaks it is used to place blame on someone else.

 

[cum2ut]

Generally to figure out the volume (in cubic inches) of a mans cock, at full erection..............

Crap...knew I should've paid closer attention to algebra in school....

 

[garbage can]

Crap...knew I should've paid closer attention to algebra in school....

Well, C2, you gotta get with the program.

How else are you going to calculate, that with a given ejaculation contraction power level, which would yield the velocity of the ejaculate, combined with the angle of the cock, and the volume of the squirt, how far away you'd have to be to hit a wall at the 3 foot level..

This is Math.............

 

[Mike_Yates]

http://www.math10.com/en/university-math/calculus/imgFig115.gif

What does this mean? Can anyone please tell me? What do the symbols mean in these equations?

 

[philosophygirl]

are you trying to get people to do your homework again?

 

[Noor]

Khan academy

 

[mercury14]

http://www.math10.com/en/university-math/calculus/imgFig115.gif

What does this mean? Can anyone please tell me? What do the symbols mean in these equations?

The language of Mordor.

 

[atmas]

The notation that looks like dy/dx means the derivative of y with respect to the derivative of x.
Basically what calculus does is analyzes the instantaneous change of one thing with respect to another. The instantaneous change of position with respect to time gives velocity; the instantaneous change of velocity with respect to time gives acceleration. If you graphed the function of the change of position over time, the instantaneous change at any given point is the tangent of the graph at that point: a tangent with a positive slope indicates that the instantaneous change is increasing. Remember that a tangent is a straight line that intersects the graph at only one point

The other symbol, which looks like a clef in music, is the symbol for integration. Integration is the opposite of differentiation. Thus the integral of acceleration, again with respect to time, is velocity. Integration over a bounded area of a function will put the lower boundary at the bottom of that symbol and the upper boundary at the top. Examples: the derivative of sine is cosine, thus the integral of cosine is sine. The derivative of cosine is -sine, thus the integral of -sine is cosine. Integration of a function also provides the area under the curve of a graph from a lower boundary limit to an upper.

 

[Mike_Yates]

The notation that looks like dy/dx means the derivative of y with respect to the derivative of x.
Basically what calculus does is analyzes the instantaneous change of one thing with respect to another. The instantaneous change of position with respect to time gives velocity; the instantaneous change of velocity with respect to time gives acceleration. If you graphed the function of the change of position over time, the instantaneous change at any given point is the tangent of the graph at that point: a tangent with a positive slope indicates that the instantaneous change is increasing. Remember that a tangent is a straight line that intersects the graph at only one point

The other symbol, which looks like a clef in music, is the symbol for integration. Integration is the opposite of differentiation. Thus the integral of acceleration, again with respect to time, is velocity. Integration over a bounded area of a function will put the lower boundary at the bottom of that symbol and the upper boundary at the top. Examples: the derivative of sine is cosine, thus the integral of cosine is sine. The derivative of cosine is -sine, thus the integral of -sine is cosine. Integration of a function also provides the area under the curve of a graph from a lower boundary limit to an upper.

.................

 

[tactful]

I + D + 10 + Twenty.