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2 gru 2020 · AssuminG you can indeed work with $\frac{k}{0}$, by the same algorithm, you could say that for any $n$, $8$ divided by $0$ is $n$ with a remainder of $8$, thus leading in a contradiction. Why is this a contradiction?
1. Here, we show you a step-by-step solved example of operations with infinity. This solution was automatically generated by our smart calculator: $2^ {\infty}$. 2. Apply a property of infinity: $k^ {\infty}=\infty$ if $k>1$. In this case $k$ has the value $2$. $\infty $.
Division by zero. The reciprocal function y = 1 x. As x approaches zero from the right, y tends to positive infinity. As x approaches zero from the left, y tends to negative infinity. In mathematics, division by zero, division where the divisor (denominator) is zero, is a unique and problematic special case.
10 sty 2018 · To put all of this into mathematical terms, dividing by 2 means finding a number (5) by which we can multiply 2 to get 10: 10 / 2 = 5 because. 10 = 2 * 5. If we could divide 10 by 0 (I'll call the answer X), we would be saying that: 10 / 0 = X because. 10 = 0 * X.
Dividing by a really small number makes a really big negative number, so dividing by zero should make negative infinity. 2/0 = ∞ and 2/0 = -∞ can't both be true, so we say 2/0 is undefined instead. There's no definite answer to that equation.
6 gru 2021 · The argument follows that as the number approaches zero, the result approaches infinity. Therefore, we should approximate the result for 1/0 as infinity.
One way to explain that division of x by 0 is undefined is by contradiction. Suppose x / 0 = a and suppose x is a non zero value. Then, by cross multiplication, we get 0 ⋅ a = x. At this point ask the child what number times 0 equals a non zero number.
