Difference between revisions of "Quadratic Equations Activity2"
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− | + | A gardner wants his garden to have a geometrical shape. He decides on the following rules for building the flowerbeds.<br> | |
#They must all be rectangular | #They must all be rectangular | ||
#The perimeter and area must be the same.<br> | #The perimeter and area must be the same.<br> | ||
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x^2 =4x by x <br> | x^2 =4x by x <br> | ||
x=4 | x=4 | ||
− | This must be discussed.]] | + | This must be discussed. |
+ | '''To link back to the concept page''' | ||
+ | [[Quadratic_Equations]] |
Revision as of 16:30, 12 August 2014
A gardner wants his garden to have a geometrical shape. He decides on the following rules for building the flowerbeds.
- They must all be rectangular
- The perimeter and area must be the same.
How many different flower beds can the gardener make if one of the sides ia 3 units less than the other side.
How many different flower beds can the gardener make if both the sides are of same length.
- notes for teacher-
The aim of this activity is to make a situation that leads to the quadratic equation-
x(x-3)=4x-6
x^2=4x
Students need to use their own strategies to solve the equations.
Students may, for example establish a set of equivalent quadratic equations through the balancing method which they are familiar in the context of linear equations.
- .x^2-3x = 4x-6 => x^2-7x= -6
- .x^2-4x = 0
However ,students will probably have no other methods available but to solve using numerical method. They might set up tables from original eqn.
They need to be encouraged to move through the numbers to find the solutions and to make sense of the solution. It also needs to be made explicit here that we are now dealing with an equation that involves a term with an unknown of second degree. This is one feature that distinguishes it from linear equation.
- note- In using the balancing method pupil might very well divide both sides of equation
x^2 =4x by x
x=4
This must be discussed.
To link back to the concept page
Quadratic_Equations