when both numbers are the same...
Zero pairs are pairs of numbers that sum to zero, typically consisting of one positive number and its corresponding negative counterpart. For example, (3, -3) and (-5, 5) are zero pairs because their sums equal zero. In algebraic contexts, zero pairs illustrate the concept of balance and cancellation, often used in solving equations and simplifying expressions. They play a crucial role in understanding additive inverses and the properties of numbers.
Zero
Zero
Zero pairs on a number line refer to pairs of numbers that sum to zero, typically one positive and one negative number. For example, on a number line, the pair (+3) and (-3) would be considered a zero pair because they cancel each other out, resulting in a total of zero. This concept is often used to illustrate the idea of balancing equations and understanding additive inverses.
Two integers which sum to zero (e.g. 3 and -3) are additive inverses of each other. All pairs of additive inverses sum to 0 and all pairs of integers which sum to 0 are additive inverses.
the charateristics of zero pairs is that you have to always end to 0 ,if not then it is not a zero pair .you could use counter chips to help you understand it better
A trapezoid (in most cases)
A zero pair is when one pairs a positive counter and a negative counter.
The molecule BeCl2 has zero lone pairs.
A cone
Zero
ZERO!
Zero
A pair of numbers with a positive and negative sign where the sum is zero
Zero
A zero pair is an ordered pair of (0,0) located absolutely on the origin of a coordinate graph.
The correct term isA zero pair is when one pairs a positive counter and a negative counter.HOPE THAT HELPED!!!**Calypso214