An < 0, n is odd
To understand this statement, let’s break it down into separate parts:
To understand this statement, let’s break it down into separate parts:
1. “An < 0”: This means that the value of “An” is less than zero. It suggests that “An” is a mathematical expression or a sequence of numbers.
2. “n is odd”: This means that the value of “n” is an odd number. In mathematics, odd numbers are integers that are not divisible evenly by 2.
Now, let’s consider some important details about odd numbers and negative numbers:
– When you multiply an odd number by a negative number, the result is always negative. For example, (-3) * 5 = -15.
– When you add an odd number to a negative number, the result may be positive, negative, or zero, depending on the specific values involved. For example, (-3) + 5 = 2, (-3) + (-5) = -8, and (-3) + (-3) = -6.
Based on these facts, we can conclude that if “An” is a sequence of negative numbers and “n” is odd, then the sum of the terms in the sequence will be negative.
It is important to note that without knowing the specific values of “An” or the context of the problem, we cannot provide further details or examples. The given statement is a general statement about the behavior of sequences of negative numbers when “n” is odd.
More Answers:
Exploring Even Functions: Understanding Symmetry and CharacteristicsUnderstanding Odd Functions: Properties, Examples, and Applications
Understanding Function Machines: A Visual Representation of the Relationship Between Inputs and Outputs in Mathematical Functions