3 scores max per player; No foul language, show respect for other players, etc.
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Game: CAT AND MOUSE
Aim: Catch the white mice
Method:
Move the cat with the arrow keys or by tapping in the game area to catch the white mouse. Avoid the red balloons but hit the blue balloons.
Your final score is based on all of that plus number of questions answered right, and the time taken.
6th grade / Number / Fractions / Multiply fractions / Fractions of amounts
Calculating fractions of amounts involves finding a fraction of a given quantity or number. The process of calculating fractions of amounts can be done in two ways.
Method 1: Divide the number or quantity by the denominator of the fraction, then multiply the result by the fraction numerator to get the answer.
This method can be summarised as:
fraction of amount = (amount ÷ denominator) x numerator
Method 2: Convert the fraction to a decimal then multiply that decimal by the quantity or amount. Follow the steps below to see how this method works:
Step 1: Convert the fraction to a decimal
The first step in calculating fractions of amounts is to convert the fraction to a decimal. To do this, you need to divide the numerator by the denominator. For example, if you want to calculate 1/4 of 80, you would divide 1 by 4, which gives 0.25.
Step 2: Multiply the decimal by the quantity
Once you have converted the fraction to a decimal, the next step is to multiply the decimal by the quantity you are trying to find the fraction of. For example, to find 1/4 of 80, you would multiply 0.25 by 80, which gives you the answer of 20.
So, the general formula to calculate fractions of amounts with this method is:
fraction of amount = (numerator ÷ denominator) x amount
For example, to calculate 3/5 of 100, you would follow these steps:
Step 1: Convert the fraction to a decimal
3 ÷ 5 = 0.6
Step 2: Multiply the decimal by the quantity
0.6 x 100 = 60
Therefore, 3/5 of 100 is 60.
With our Cat and mouse math game you will be practicing the topic "Fractions of amounts" from 6th grade / Number / Fractions / Fractions. The math in this game consists of 16 questions that ask you to find fractions of amounts by first dividing by the fraction denominator then multiplying by the numerator.
In Year 7 in the UK, students typically continue to build upon their understanding of fractions, which they started developing in earlier grades. Here's an overview of key concepts related to fractions that are commonly taught in Year 7:
Understanding Fractions: Students learn that fractions represent parts of a whole or a group. They understand that a fraction consists of a numerator (the number above the fraction line) and a denominator (the number below the fraction line). The numerator represents the number of parts being considered, while the denominator represents the total number of equal parts that make up a whole.
Equivalent Fractions: Students explore equivalent fractions, which are different fractions that represent the same value. They learn that equivalent fractions can be obtained by multiplying or dividing both the numerator and the denominator by the same number. For example, 1/2 is equivalent to 2/4, 3/6, and so on.
Comparing and Ordering Fractions: Students learn to compare fractions and order them from least to greatest or greatest to least. They understand that when fractions have the same denominator, the one with the larger numerator is greater. When fractions have different denominators, they convert them to equivalent fractions with a common denominator to compare.
Adding and Subtracting Fractions: Students begin to add and subtract fractions with the same denominator (for example, 1/4 + 2/4). They also learn to add or subtract fractions with different denominators by finding a common denominator and then adjusting the numerators accordingly.
Multiplying and Dividing Fractions: Students explore multiplication and division of fractions. They learn to multiply fractions by multiplying the numerators together and the denominators together. For division, they learn to invert the second fraction and multiply. For example, to divide 1/4 by 1/2, you multiply by the reciprocal, which is 2/1.
Fractions in Real-Life Contexts: Students apply their understanding of fractions to real-life situations, such as measurements, recipes, and problem-solving scenarios. They learn to interpret and solve word problems involving fractions.
Cat versus mouse game with added balloons for math and fun. You are the ginger cat, and your life is being made a misery by some white mice which have come into the house and are proving hard to catch. Not to mention there is a mouse house party going on and lots of balloons getting in the way of your hunting.
So you have to catch the white mice, forget about the gray mice, hit the blue balloons but avoid the red balloons, and answer math questions (you are a CLEVER cat...). If it sounds complicated and a bit frantic, that's because it is. Do your best but don't worry if you can't catch all the mice - neither can we. It's a cat's life...
UXO * Duck shoot * The frog flies * Pong * Cat and mouse * The beetle and the bee
Rock fall * Four in a row * Sow grow * Choose or lose * Mix and match
CAT AND MOUSE is a quirky take on the perennial enmity of ponderous predator and plucky prey. Here are the basics:
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