What is the opposite of zero?
That's because the opposites of the number is the negative number of that number. but 0 is neither positive nor negative. so the opposite of 0 is 0.
In light of this, what is the opposite of 0 in math?The opposite of zero is negative zero. Zero cannot have an opposite because it cannot be positive or negative.
Accordingly, what is the opposite word of zero?What is the opposite of zero?
Adding to that, is infinity the opposite of zero?In other words, ∞ is an undefined symbol. If you're using the projectively extended real line or the Riemann sphere, then the reciprocal of zero is infinity, and the reciprocal of infinity is zero. In other words, 1/0=∞ and 1/∞=0. (Note that the reciprocal of infinity is exactly zero, not infinitesimal.
Do you have your own answer or clarification?
Related questions and answers
For mathematicians the answer is easy: zero is an even number. Because any number that can be divided by two to create another whole number is even.
Some Very Big, and Very Small Numbers
"Zero" is the usual name for the number 0 in English. In British English "nought" is also used. In American English "naught" is used occasionally for zero, but (as with British English) "naught" is more often used as an archaic word for nothing. "Nil", "love", and "duck" are used by different sports for scores of zero.
It's faster and easier to say “O” instead of “0” in postal codes and phone numbers, when it's clearly understood that it's a number, not a letter, in the placement. On the other hand, in a more random alphanumeric string you need to be clear, because both “0” and “O” could be present.
A: No, the number 1 is not an even number - it is an odd number.
0 (zero) is a number, and the numerical digit used to represent that number in numerals. It fulfills a central role in mathematics as the additive identity of the integers, real numbers, and many other algebraic structures. As a digit, 0 is used as a placeholder in place value systems.
Even numbers can be divided evenly into groups of two. Odd numbers always end with a digit of 1, 3, 5, 7, or 9. 1, 3, 5, 7, 9, 11, 13, 15, 17, 19, 21, 23, 25, 27, 29, 31 are odd numbers.
That's because “aught” can mean “everything,” or “zero.” In British English, it often means “all,” as in “for aught I know, football uses a round ball.” In the US, it more commonly means “nothing.” Garner's Modern American Usage says that was originally a mistake.
In mathematics, expressions like 1/0 are undefined. But the limit of the expression 1/x as x tends to zero is infinity. Similarly, expressions like 0/0 are undefined. But the limit of some expressions may take such forms when the variable takes a certain value and these are called indeterminate.
However, in computing, some number representations allow for the existence of two zeros, often denoted by −0 (negative zero) and +0 (positive zero), regarded as equal by the numerical comparison operations but with possible different behaviors in particular operations.
If you ask Siri this question in the iOS 8 operating system, the iPhone's virtual assistant will cleverly tell you that you're making no sense. “Imagine that you have zero cookies,” Siri's response begins, “and you split them evenly among zero friends.
Infinity is not a number is a concept, but let's imagine one infinity made out of numbers from 0 to infinity: You will have th following list: 0, 1, 2 ,3followed by a never ending list of numbers. So in this case, this infinity minus one is still infinity.
One is a subtractive color model (CMYK) -- the top image, where the opposite of yellow is purple. This is for real-world, tangible things like paint, ink, etc. The other is a additive color model (RGB) -- the bottom image, where the opposite of yellow is blue.
In the real numbers, zero does not have a reciprocal because no real number multiplied by 0 produces 1 (the product of any number with zero is zero).
The first recorded zero appeared in Mesopotamia around 3 B.C. The Mayans invented it independently circa 4 A.D. It was later devised in India in the mid-fifth century, spread to Cambodia near the end of the seventh century, and into China and the Islamic countries at the end of the eighth.
Similarly, expressions like 0/0 are undefined. But the limit of some expressions may take such forms when the variable takes a certain value and these are called indeterminate. Thus 1/0 is not infinity and 0/0 is not indeterminate, since division by zero is not defined.
Directly opposite on the color wheel, blue tones are a natural fit for orange. These complementary colors look especially stunning when used in saturated shades, such as red-orange and indigo blue.
There is no such concept as negative infinity. Infinity can be related to anything that has constant recurrence, be it positive or negative. For Example. Take the number line.
Since the definition x0 = 1 is based upon division, and division by 0 is not possible, we have stated that x is not equal to 0. Actually, the expression 00 (0 to the zero power) is one of several indeterminate expressions in mathematics. It is not possible to assign a value to an indeterminate expression.
The reciprocal of 1 is 1 itself. The reciprocal or multiplicative inverse is the number we have to multiply to obtain an answer equivalent to the multiplicative identity 1. The reciprocal of 1 is 1.
On the colour wheel, Yellow is opposite of Purple. The Primary colours are RGB. So Purple is made from Red & Blue, Yellow is made from Red & Green.
0 divided by 3 is 0. In general, to find a ÷ b, we need to find the number of times b fits into a.
Q: Is 2 an Odd Number? A: No, the number 2 is not an odd number - it is an even number.
0/0 is undefined. If substituting a value into an expression gives 0/0, there is a chance that the expression has an actual finite value, but it is undefined by this method. We use limits (calculus) to determine this finite value.
In the RGB (current) colour wheel, blue is the opposite (complementary) colour to yellow. In the older, traditional colour wheel used by Monet and Van Gogh, purple was the complementary colour to yellow.