If you mean 1 x 0, that's 0, not infinity.
infinity
10 (or e) to the power of x range from zero to infinity. Lets try the extreme cases: 10^infinity = infinity 10^0 = 1 10^-infinity = 1/infinity = 0
Zero is nothing, infinity is everything.
Infinity... 5 over 0 will be represented as 5/0 Any number divided by 0 results in infinity
Positive: (0, infinity)Nonnegative: [0, infinity)Negative: (-infinity, 0)Nonpositive (-infinity, 0]
If you mean 1 x 0, that's 0, not infinity.
The ISBN of The Infinity Gauntlet is 0-7851-2349-0.
Undefined: You cannot divide by zero
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infinity
Interesting. Assuming "times" is a variable: You're question is what is 0/times + times * (0/+0*100) That would be 0 + times * (0/0) 0/0 = infinity(Anything over 0 = infinity) So then, you can figure out that it is times * infinity which is infinity.
no - 10 doesn't equal 1However, could consider the so-called 'Bold Hypothesis' (introducing a new mathematical object (infinity) which equals 1/0, but otherwise behaves like a real number):1/0=infinity, therefore 1=infinity*0you know: 10*0=1*0 (any number *0=0)multiply each side by infinity (1/0): 10*0*infinity=1*0*infinitywhich is the same as: 10*(0*infinity)=1*(0*infinity)we have already said (1st line) that 1=infinity*0, therefore: 10*1=1*1which simplifies to give: 10=1which is impossible?!
Undefined: You cannot divide by zero
One must be careful when using infinity in math. Infinity is a concept - not a value. Sometimes, we may be tempted to try treating infinity as a value or a variable. Whenever we want to use infinity in math, we generally do so through the concept of limits. For example, instead of saying: 1/∞ = 0 We instead say: lim 1/x = 0 x→∞ The use of limits allows us to use infinity without falling into the trap of attempting to do arithmetic with infinity, which is not defined. In calculus, we use limits and L'Hopital's rule to get around this, and allows us to evaluate functions which simplify to an indeterminate form (0/0, ∞/∞, 0*∞, 0^0, ∞^0 and ∞ - ∞). Sometimes we seemingly treat infinity as a value when describing asymptotes or end behavior of a function, for example: lim 1/x = ∞ x→0+ It is important to realize that we are not saying that 1/0 = ∞, but we are ACTUALLY saying: "As x approaches 0 from the right, 1 / x approaches infinity."
Infinity divided by any finite number is infinity. Here are the rules: 1. Infinity divided by a finite number is infinite (I / f = I); 2. Any finite number divided by infinity is a number infinitesimally larger than, but never equal to, zero (f / I = 1 / I); 3. Infinity divided by infinity is one (I / I = 1), or in fact any other positive number (I / I = and so on...); 4. Infinity multiplied by zero (no infinity) is zero (I * 0 = 0); 5. Infinity divided by a positive finite number is infinity (I / +f = I); 6. Infinity divided by a negative finite number is minus infinity (I / -f = -I); 7. Infinity divided by zero is not possible; 8. Infinity plus infinity is infinity (I + I = I); 9. Zero divided by infinity (nothing divided into infinity) equals zero (0 / I = 0); 10. Infinity plus a finite number is infinity (I + f = I); 11. Infinity minus a finite number is infinity (I - f = I); but 12. Infinity minus infinity, due to the nature of infinity, can be zero, infinity, or minus infinity (I - I = -I, 0, I).
answer is 0