Standard Chartered Bank itself is a full form of a SCB.
345 = 3.45 × 10²
3,060,066,900. Standard form is just it written as a number.
1,2,3,4,5,6,7,8,9,10,20,30,40,50,60,70,80,90,100,200
infinity
standard
It IS indeterminate.
Infinity/2,000,000,000,000,000 is the simplest form.
12X1.25
∞ -- Copy and paste this character if you want to use an infinity symbol on your iPhone. There is no infinity symbol available on the standard iPhone keyboard.
capability is infinity
∞ -- Copy and paste this character if you want to use an infinity symbol on your iPhone. There is no infinity symbol available on the standard iPhone keyboard.
Infinity added to anything is infinity (with the exception of -infinity, as it is an indeterminate form). Thus, infinity + 2 = infinity.The problem is that (although it is easy to think of it this way) infinity is not a number. Infinity is, rather, the concept that something is boundless.Thus, "infinity + 2" is a category error. (This is (supposed to be) a sum in maths, and infinity is not a number.)
Firstly, infinity is not a number (at least in lower level mathematics). You must instead use the language of limits to describe infinity. Using limits, a function which diverges to infinity multiplied by a function which diverges to infinity has a product which also diverges to infinity. However, taking this product, and subtracting away a function which diverges to infinity is "of indeterminate form". It might converge to zero, it might be diverge to positive infinity, it might diverge to negative infinity, or it might converge to a constant. In order to figure out which one of these possibilities applies, you must get the indeterminate form into the form infinity divided by infinity or 0/0 and then apply L'Hospital's rule. Edit: Just a pet peeve of mine. It's L'Hôpital, not L'Hospital. Even textbooks don't spell it right.
It is already in standard form.
It is already in standard form.
Yes. In such a case, manipulate the problem so that you get the indeterminate form 0/0 or infinity/infinity, then proceed with l'Hopital's Rule.