Today we're going to go over the President Rules of arithmetic, which allow us to workout calculations involving brackets, powers, division and multiplication, addition and Subtraction, and let us all arrive at the same answer. Then afterwards, we're going to go on and do calculations involving positive and negative numbers. And use rules for addition, subtraction, multiplication and division. But first, let us look at this expression. It's 2 + 4 * 3 - 1 and let us work at night. Well, we can work it out first by moving from left to right, and if we do that then we will add, then multiply and then subtract. If we do that, we get 2 + 4, which is 6 times by three. Is it T minus one gives us the answer 17. But if we change the order, the calculation and we use add first, then subtract and then multiply. What answer do we get? Well, 2 + 4 is 6. Do they subtract next 3 - 1 which is 2 so 6 * 2's answer is 12. Or we could multiply first, then add followed by subtract. Well, if we multiply first, that's 4 * 3, which is 12. Do the add 2 + 12 which is 14. Then subtract the answer is 13. And so on. And as you can see, we get different answers according to the order in which we do the operations, so that's not very good. So we need to have a presidents in which we know the order in which we do the calculation. The order that most people use is. We do brackets first. Followed by powers. And then multiplication Indovision. Then finally addition and Subtraction. And that's a lot to remember. So there's an acronym to allow you to remember it. And that acronym is barred maths. BODMAS. Be for brackets. Oh for powers. Date for division. An multiplication for the M. And these two go together 'cause they have the same priority Avery Edition. And As for subtraction. And these two go together because they have the same priority. So if you remember Bob Maths. FIFA brackets and Overpowers followed by division and multiplication, and then finally addition and Subtraction. If you want to calculate any expression, use that order and you won't go wrong. So why don't we look at some examples? Take for example, the first one that we started off with 2 + 4 times by 3 - 1. Now using board maths we should have no problem working night this expression we do the Times first, so it's two add 12 - 1 night. The addition and subtraction of the same order of priority. So we work from left to right. That's 2 + 12 which is 14 - 1 which is 13. Look at this next example. Here we've got brackets and using board mass brackets are done first, so 3 + 5 is it, so our expression becomes two times it, which is 16. Can be easier. What about the next one 9 - 6? But I've got to add the plus one now in this case we've got the subtract and the ad together. So we've got the same priority. The rule is work from left to right, so we say 9 - 6 which is 3 add 1 which is 4. The last two involving powers. 3 + 2 squared while using board Mars again, we do the squares, the powers first 2 squared is 4, so our expression becomes 3 + 4 and 3 + 4 is 7. And finally this expression. 3 + 2 all squared. Now we've got powers, an brackets. But remember using board Mads we do what's inside the brackets first, so it's 3 + 2 which is 5. And then we have to square the five which is 25. Now in these two last examples with the got the same numbers. And we've got a square, but you've got two totally different answers. And the reason why is in this one the square is for the things inside the bracket. The 3 + 2, whereas in this one this square relates to just the two. So remember when you're doing any calculations which involve operations such as brackets, powers, division, multiplication, subtraction and addition, use board baths and you won't go wrong. What math means? Brackets first, then powers followed by multiplication and division. And then addition to Subtraction. And when you have operations of the same priority. He just work from left to right. Nothing could be easier. And now I will move on to calculations involving positive and negative numbers. Now what are positive and negative numbers? Well, if we take all the real numbers except 0. All real numbers. Can be. Either positive or negative, and of course except 0. Now, where are those numbers? Well, if we look on a number line. And position 0 all the positive numbers are to the right. And all the negative numbers are to the left. And we represent the numbers on the number line like this positive one, positive 2 positive 3 positive for. Positive 5 and so on. Negative one negative, two negative, three negative, four negative 5. Notice how we've written in numbers, the positive numbers and the negative numbers. We write positive three like this and negative for like this. The sign of the number is written as a superscript. Now we do this. To help our understanding so that we don't confuse the sign of the number with addition and Subtraction. But of course with practice. We drop this and we just use the normal standard notation. But for this session I'm going to use the superscripts just to help our understanding. But what about calculations involving positive and negative numbers? What about addition, subtraction, multiplication and division? Well, I would take some examples. If I take these two examples, negative four at positive 5. And. Positive for. Subtract positive 9. If I have those two calculations, what do they work out to be well? In the first instance, we can use a number line to help us evaluate them. And we have to remember that using a number line addition means you kind on in that direction, and subtraction means you kind back in that direction. So using those two little rules will calculate this expression and then this. So take this one to begin with negative 4. Add positive five. Start at negative, 4 on the number line. And kind on five 12345, so it negative 4 add positive 5 gives me the answer positive one. For the other example, we've got a subtraction, so we started positive four, and we subtract positive 9. To start a positive for. And kind back 91234. 56789 so positive for subtract. Positive 9 gives you negative 5. It could be simpler. Now, to simplify matters a little bit further, it really is a fast to keep writing all these signs. And because positive numbers are the numbers that we usually use in calculations, we drop them. We dropped the sign. So positive 5 can be written is just five, and we know that positive one is equal to 1 and positive 9 has 9. And it's understood by everyone that where you have numbers with no sign written there then they are positive numbers. And I'm going to use that. In all my calculations following on. But if you notice in this calculation and in this one. We've added and subtracted positive numbers. But how do we add and subtract negative numbers? Well, try and generate an easy route. Going to look at some patterns of both addition and Subtraction and will start with addition. And we'll start with something that we know. If we start with 5 + 2, we know that is 7. And then I'm going to write a sequence of calculations which follow on from this. 5 at one. Is equal to 65. Add zero is equal to 5. Notice in this sequence of addition the answers decreased by one. As the numbers that we add decreased by one. So if we follow the pattern. We take 5 add negative one because negative one is 0. Subtract 1 is one less than zero, then it must equal for. If we continue the pattern on. And five add negative, two must equal 3 and five ad. Negative three must equal two and five add negative. Four must equal 1. Not if we look at these additions. These additions of negative numbers we can actually write these calculations as subtractions of positive numbers, so 5 add negative, one would be the same as five subtract 1 and you get the same answer for. Similarly, 5 add negative two can be written as five subtract 2 and you get the answer 35 add negative. Three can be written as five, subtract 3. Give me the answer 2 and then 5. Add negative four is the same as five. Subtract 4, which is one. So when we have the addition of negative numbers. That's the same as the subtraction of the positive number. So I had these two examples. It at negative 10. And negative 9 at negative 5. Using that room. Hi, we calculate the answer. Now we take it add negative 10. That's the same as it subtract 10. I'm thinking about the number line. He started it and you go back 10. So you go back to 0 and then another two you get to the answer negative 2. And with this example. Negative nine and negative five. We can rewrite that as negative 9 subtract 5 again. Visualizing it on the number line start at negative 9. And you go back five, go back five so your land at negative 14. So when we have the addition of negative numbers, it's always easier to change them into subtraction of positive numbers. But the one thing that we haven't done is the subtraction of negative numbers. So again, I'd like to use a pattern to help us workout the rule that we're going to use. If we start off with what we know. 4 subtract 2 is 2. So 4 subtract 1 is 3 and four subtract 0 is for. Notice in this sequence of Subtractions, the answers are going up by one. As the numbers that we're subtracting decreased by one. So if we continue the pattern in the calculations, the next calculation would be 4. Subtract negative one and the answer will be 5. You add one on to the four to make 5, and four subtract negative 2. Will be 6 and four. Subtract negative. Three would be 7. And four subtract negative four is it? Now again. If we look at these subtractions of negative numbers. What calculation would be easier to do using the numbers but still arriving at the same answer when I think it's quite obvious. For this one, it's for AD one. And that gives us the answer 5. The numbers of the same, but the operation and assign are different. For this one it before add 2 and that will give us 6. For this one it before at three, and that will give us 7. And finally, for ad for which will give us it. So. If we look at our pattern, we can see that when you've got the subtraction of a negative number, that's the same as the addition of a positive number. So we'll use that room to workout these calculations if we take it, subtract negative 10. And negative 6 subtract negative 13. What answers do we get if we use our room where we change the subtraction to addition of a positive number? So is it plus 10? What could be easier? That's 18. This one you've got negative 6 add 13 slightly harder, but not too difficult. They give negative 6 and the number line and go forward kind on 13. He kind on 6 and then another Seven. So the answer is positive 7 written like that. So how can we combine all these rooms together in a nice, easy way for you to remember? Well, this is one way. If the operation in the sign are the same like this. Sam The calculation works like an addition. Off a positive number. If the operation and assign are different like this. Then the operation. Works like this subtraction. Off a positive number. Now, if you remember those two Golden rules, then the addition and subtraction of positive and negative numbers is dead easy. Now we've talked about addition and subtraction of positive and negative numbers, but wanna bite multiplication Indovision. Well, we start with what we know. We know how to multiply and divide positive numbers. We know that five times by 5 is 25. An 5 / 5 is one dead easy. But what about the multiplication division of negative numbers? Well, I'll use patterns the way I did before. In addition, Subtraction. And I'll start off with this calculation and continue doing a sequence of multiplications that involve negative numbers, and we'll see if we can get a rule coming out from the pattern in the calculations. For the next calculation here, I'll say this is 5 times by 4. And we know that is 20. Five times by 3:15, five times two is 10. 5 * 1 is 5 and 5 * 0 is not. I notice in these multiplications the answers. Are going down by 5 as the number that we times by decreases by one. So the next calculation in the sequence would be 5 times by negative one. And if we use the pattern that have just stated. We subtract 5 from zero as we subtract 5 from zero, we get negative 5. The next calculation would be 5 times by negative 2. Negative 5 subtract 5 is negative 10. Five times by negative 3. Negative 10 subtract 5 negative 15. Will do just one more just to see if we can spot the pattern and the pattern is working five times negative 4. Take negative 15 and subtract 5. That's negative 20. So look at. Our multiplications by a negative number. We get a negative number answer. So when we multiply a negative sorry, a negative by a positive. Will always get a negative answer. And vice versa if we multiply a negative by a positive. Will get a negative. So if I give you these two examples. 6 times by negative 5. Steady, easy to workout. The answer you just multiply the six by the five to get 30. The signs are different. Remember this is positive 6 times by negative 5 the two signs are different, so the answer is a negative number negative 30. If we take negative four times by three. Multipliers normal 3/4 or 12. And then take into account the signs. This is a negative. This is a positive. 2 signs different. So the answer is negative. And the same goes for division. And we can just double check that by looking at these two calculations. Negative 30 divided by positive six must equal negative 5. And negative 12 divided by positive three must equal negative 4. So when the signs are different and you multiply positive and negative numbers together in pairs, the answer will always be a negative number. But we haven't finished just yet. What if you multiply and divide by negative numbers? What happens there? Well, again, I'm going to use patterns. I like using patterns because it gives me a bit of confidence that I'm doing things correctly and I always start off with things that I know. So if I start off with negative five times by positive 4. I know the answer is negative 20 because the signs are different and 5 * 4 is 20. Next one in the sequence negative five times by three. That will give us negative 15 negative 5 * 2 negative, ten negative 5 * 1 is negative, five negative 5 * 0 is equal to 0. Now look at the pattern. Is a bit like a dejavu. We've done this before. Look at the answers. You can see that we are increasing by 5 each time as we multiply by one less each time. That seems a bit odd, but stay with Maine. The next multiplication, if we keep the pattern in the calculations, the same would be negative five times by negative one. And according to our pattern, that will equal 5 more than zero, which is positive 5. Negative five times negative 2, which is the next calculation in sequence. That would be five more than five, which is 10. Negative five times by negative 3. Is 15th. Negative five times negative four is 20. So. It's really great. See that when we multiply negative numbers together in pairs. We get a positive answer. Negative by negative gives it a positive negative negative positive, negative negative positive negative negative positive is not great. Dead easy. So if I had this calculation negative 6 times by negative three, you multipliers normal. 6 * 3 is it teen? And the answer is positive positive via team because it's two negatives makes the positive. And the same goes with this one. If we had negative 9 times by negative 229382. Two negatives. The answer is a positive, so again we get the same answer it team but different numbers in the calculation. But remember where else did we get a positive answer? When you multiplied 2 positive numbers together. So if you multiplied 6 by three, you'll get it team and when you multiplied 9 by two you get it too. So when the signs of the same. Then the answer will be positive whether they are two negatives be multiplied together or two positive numbers being multiplied together. And that's a lot to take in for multiplication and division of negative numbers. I'd like to summarize that bit by again using a diagram when the signs of the sea. A positive times by a positive or a negative times by a negative. The answer. Is positive. Is a positive number when the signs are different. I positive times by a negative or a negative times by a positive. The answer. Is negative. And the same goes the same rules go if you divide. So if I had these examples. Negative 6 divided by. Negative 2. My answer will be do the division first 6 / 2, which is 3 and then think about the signs negative negative signs saying so. The answer is positive. And if we had this division negative 12 divided by positive 3. Do the division is normal 12 / 3 is for. Think of the signs signs, different negative and a positive. So the answer is negative.