Question
Consider each expression. Select the expressions you can use to find the product 532?
- (50 + 3)2
- (50 – 3)2
- (60 + 7)2
- (60 – 7)2
The correct answer is: (50 + 3)2
(50 + 3)2 = 532
(60 – 7)2 = 532
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In front of a school are several gardens in rectangular raised beds. For the area of the rectangular area given, use factoring to find the possible dimensions. Could the garden be square?
x2 – 4y2
Here we used the concept of algebriac equations, trinomials and squares to factories the given expression. An expression with variables, constants, and algebraic operations is known as an algebraic expression (like subtraction, addition, multiplication, etc.). Terms comprise expressions. So, the side lengths are x + 2y and x – 2y. So, it has unequal length and width. Then it is a rectangle.
In front of a school are several gardens in rectangular raised beds. For the area of the rectangular area given, use factoring to find the possible dimensions. Could the garden be square?
x2 – 4y2
Here we used the concept of algebriac equations, trinomials and squares to factories the given expression. An expression with variables, constants, and algebraic operations is known as an algebraic expression (like subtraction, addition, multiplication, etc.). Terms comprise expressions. So, the side lengths are x + 2y and x – 2y. So, it has unequal length and width. Then it is a rectangle.
In front of the school are several gardens in rectangular raised beds. For the area of the rectangular area given, use factoring to find the possible dimensions. Could the garden be square?
x2 + 32x + 256
Here we used the concept of algebriac equations, trinomials and squares to factories the given expression. An expression with variables, constants, and algebraic operations is known as an algebraic expression (like subtraction, addition, multiplication, etc.). Terms comprise expressions. So the side length is (x + 16) and all the sides are equal in length. So, it is a square.
In front of the school are several gardens in rectangular raised beds. For the area of the rectangular area given, use factoring to find the possible dimensions. Could the garden be square?
x2 + 32x + 256
Here we used the concept of algebriac equations, trinomials and squares to factories the given expression. An expression with variables, constants, and algebraic operations is known as an algebraic expression (like subtraction, addition, multiplication, etc.). Terms comprise expressions. So the side length is (x + 16) and all the sides are equal in length. So, it is a square.
Two pieces of fabric are being used for clothing designs for a fashion show at school. Expressions for the areas of the rectangular piece are shown.
Factor the expressions for the areas completely.
a²+2ab+b² = (a+b)².
Two pieces of fabric are being used for clothing designs for a fashion show at school. Expressions for the areas of the rectangular piece are shown.
Factor the expressions for the areas completely.
a²+2ab+b² = (a+b)².