Just make sure the small end points to the small value!Here is another example using '≥' and '≤': Example: Becky has $10 and she is going shopping. How much will she spend (without using credit)?Answer: Something greater than, or possibly equal to, $0 and less than, or possibly equal to, $10: Becky Spends ≥ $0 Becky Spends ≤ $10 This can be written down in just one line: $0 ≤ Becky Spends ≤ $10 A Long Example: Cutting RopeHere is an interesting example I thought of: Example: Sam cuts a 10m rope into two. How long is the longer piece? How long is the shorter piece?Answer: Let us call the longer length of rope 'L', and the shorter length 'S' L must be greater than 0m (otherwise it isn't a piece of rope), and also less than 10m: L > 0 L < 10 So: 0 < L < 10 That says that L (the Longer length of rope) is between 0 and 10 (but not 0 or 10) The same thing can be said about the shorter length 'S': 0 < S < 10 But I did say there was a 'shorter' and 'longer' length, so we also know: S < L (Do you see how neat mathematics is? Instead of saying 'the shorter length is less than the longer length', we can just write 'S < L') We can combine all of that like this: Equally0 < S < L < 10 That says a lot: 0 is less that the short length, the short length is less than the long length, the long length is less than 10. Reading 'backwards' we can also see: 10 is greater than the long length, the long length is greater than the short length, the short length is greater than 0. It also lets us see that 'S' is less than 10 (by 'jumping over' the 'L'), and even that 0<10 (which we know anyway), all in one statement.
NOW, I have one more trick. If Sam tried really hard he might be able to cut the rope EXACTLY in half, so each half is 5m, but we know he didn't because we said there was a 'shorter' and 'longer' length, so we also know: S<5 and L>5 Another Word For EqualityWe can put that into our very neat statement here: 0 < S < 5 < L < 10 And IF we thought the two lengths MIGHT be exactly 5 we could change that to 0 < S ≤ 5 ≤ L < 10 An Example Using AlgebraOK, this example may be complicated if you don't know Algebra, but I thought you might like to see it anyway: Example: What is x+3, when we know that x is greater than 11? If x > 11 , then x+3 > 14 (Imagine that 'x' is the number of people at your party. If there are more than 11 people at your party, and 3 more arrive, then there must be more than 14 people at your party now.) |