Negative Numbers
Negative numbers play a fundamental role in mathematics, representing values below zero on the number line. These numerical entities extend our understanding beyond the realm of positive integers, enabling us to comprehend concepts such as debt, temperature below freezing, and directional coordinates. In both practical applications and theoretical frameworks, negative numbers serve as indispensable components, allowing for a comprehensive and nuanced representation of quantities in various mathematical disciplines. Understanding their properties and operations is crucial for navigating complex mathematical problems and real-world scenarios.
Questions
- How do you find the difference #-11-(-12)#?
- How do you find the quotient of #(-350)/70#?
- How do you evaluate #-34+32#?
- A diver is 7ft above water. The diver descends 12 ft in total. How deep is he in the water?
- How do you evaluate #(-2)+3#?
- How do write in simplest form given #42.3div(-6)#?
- How do you multiply #7times (-8)#?
- How do you compute #50-82#?
- How do you simplify #--8+ -8-16#?
- The temperature dropped 2 degrees each hour for 6 hours. Which integer shows the change in temperature over the 6 hours?
- How do you simplify #-8+14#?
- How do you simplify #1.25+(-2.69)#?
- How do you write in simplest form given #108div(-0.9)#?
- What is 35 divided by -7?
- How do you compute #5(18)#?
- How do you find the difference #4-5#?
- How do write in simplest form given #-1/12-(-3/4)#?
- How do you evaluate #38-(-17)#?
- How do write in simplest form given #-9.16-10.17#?
- How do you write #18-26# as a single integer?