Reflection:
1. How did you find the solutions of the given algebraic expressions?
2. What Mathematies concepts or principles did you apply in finding the solutions? Explain how you applied these
3 How would you describe the solutions obtained?
4. How did you find the lesson and activities? Why?
5. Can you give at least 3 examples of cube of a binomial?
6. How are these concepts important in your daily life?
Answers & Comments
1. How did you find the solutions of the given algebraic expressions?
-1. Solve a basic linear algebraic equation. A linear algebraic equation is nice and simple, containing only constants and variables to the first degree (no exponents or fancy stuff). To solve it, simply use multiplication, division, addition, and subtraction when necessary to isolate the variable and solve for "x".
2. Solve an algebraic equation with exponents. If the equation has exponents, then all you have to do is find a way to isolate the exponent on one side of the equation and then to solve by "removing" the exponent by finding the root of both the exponent and the constant on the other side.
3. Solve an algebraic expression with fractions. If you want to solve an algebraic expression that uses fractions, then you have to cross multiply the fractions, combine like terms, and then isolate the variable.
2. What Mathematics concepts or principles did you apply in finding the solutions? Explain how you applied these
-The mathematics concept we apply is distributing the number to the parenthesis by multiplication, getting the factors given by the given polynomial, and by adding both numbers so we can get the answer.
3. How would you describe the solutions obtained?
-Example system with infinite solutions
Example system with infinite solutions Any solution that works for one equation will also work for the other equation, so there are infinite solutions to the system.
4. How did you find the lesson and activities? Why?
- answer may vary
5. Can you give at least 3 examples of cube of a binomial?
- x − 2 x-2 x−2 , x − 6 x-6 x−6, (y + z)3 = (y + z) × (y + z) × (y + z).
6. How are these concepts important in your daily life?
- You can apply management in daily life by managing your time, managing problems that you are facing, managing household chores and others.
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