GCSE maths equation

[12345678]

A tennis court has an area of 224m^2. If the length were decreased by 1m and the width increased by 1m, the area would be increased by 1m^2. Find the dimensions of the court. Can somebody explain how you would work this out? much appreciated. To start off with, I decided that x was the length and y was the width, so xy=224m^2. I then did (x-1)(y+1)=225m^2. so xy +x -y=226m^. What do I do next, or is what I have done wrong?

 

[wjm11]

A tennis court has an area of 224m^2. If the length were decreased by 1m and the width increased by 1m, the area would be increased by 1m^2. Find the dimensions of the court. Can somebody explain how you would work this out? much appreciated.

Please see "Read before psoting".

You know that Area = Length times Width.

224 = LW for the tennis court.

If the dimensions are altered as stated, then the new length is (L - 1) and the new width is (W + 1). The new area would be (224 + 1).

Make a second equation with that information. Solve the system of equations.

 

[DrPhil]

A tennis court has an area of 224m^2. If the length were decreased by 1m and the width increased by 1m, the area would be increased by 1m^2. Find the dimensions of the court. Can somebody explain how you would work this out? much appreciated.

We like to see your work, so we know where you are getting stuck!

You must know the formula for the area of a rectangle, A = L×W
The first rectangle is L×W = 224 m^2
The second rectangle is (L - 1m)×(W - 1m) = ...

That will give you two equations in two unknowns - can you solve that system?

 

[12345678]

Please see "Read before psoting".

You know that Area = Length times Width.

224 = LW for the tennis court.

If the dimensions are altered as stated, then the new length is (L - 1) and the new width is (W + 1). The new area would be (224 + 1).

Make a second equation with that information. Solve the system of equations.

Do I expand the brackets in the second equation? So (L-1) x (w+1)= LW +L -W =226?

 

[DrPhil]

A tennis court has an area of 224m^2. If the length were decreased by 1m and the width increased by 1m, the area would be increased by 1m^2. Find the dimensions of the court. Can somebody explain how you would work this out? much appreciated. To start off with, I decided that x was the length and y was the width, so
xy = 224m^2..............(1)
I then did
(x-1)(y+1)=225m^2.
xy + x - y = 226m^2...(2)
What do I do next, or is what I have done wrong?

Great so far.

The best way to solve the system of 2 equations is probably substitution.
Solve eq. (1) for y as a function of x,
then substitute that expression for y into eq. (2).
Because there will be an x in the denominator, you should multiply through by x, giving you a quadratic equation to solve for x.
Actually, the two solutions of the quadratic will be x and y.

 

[12345678]

Great so far.

The best way to solve the system of 2 equations is probably substitution.
Solve eq. (1) for y as a function of x,
then substitute that expression for y into eq. (2).
Because there will be an x in the denominator, you should multiply through by x, giving you a quadratic equation to solve for x.
Actually, the two solutions of the quadratic will be x and y.

(1) y=224/x
(2) xy+x-y=226. If I substitute the expression in for y twice, I get x(244/x) +x-(224/x). This second part (+x-(224/x) does not seem right?. I understand that if I multiply x to get it off the bottom I get x^2 x224, but I don't understand the second part.

 

[HallsofIvy]

(1) y=224/x
(2) xy+x-y=226. If I substitute the expression in for y twice, I get x(244/x) +x-(224/x). This second part (+x-(224/x) does not seem right?. I understand that if I multiply x to get it off the bottom I get x^2 x224, but I don't understand the second part.

Yes, \(\displaystyle x\frac{224}{x}+ x- \frac{224}{x}= 224+ x- \frac{224}{x}= 226\). Mutiplying both sides by x gives \(\displaystyle 224x+ x^2- 224= 226x\) so you need to solve the quadratic equation \(\displaystyle x^2- 2x- 224= 0\).

 

[DrPhil]

(1) y = 224/x
(2) xy + x - y = 226.
If I substitute the expression in for y twice, I get
(3) x(224/x) + x - (224/x) = 226 ... don't forget to include both sides of the equation.
This second part (+x-(224/x) does not seem right?. it is fine.
I understand that if I multiply x to get it off the bottom I get x^2 x224, but I don't understand the second part.

Looking at eq. (3), the first term is just 224 m^2, which can be subtracted from both sides:

(3') x - (224/x) = 2

Now multiply all terms (both sides!) by x, and rearrange into the form of a quadratic equation.

 

[12345678]

Looking at eq. (3), the first term is just 224 m^2, which can be subtracted from both sides:

(3') x - (224/x) = 2

Now multiply all terms (both sides!) by x, and rearrange into the form of a quadratic equation.

Oh, now I understand. using the quadratic formula, x=16. Therefore the dimensions are 16 and 14, as 244/16=14. Thanks for the help, much appreciated!

 

[lookagain]

Therefore the dimensions are 16 and 14,
No, the dimensions would be 16 m. and 14 m. You must include the units.



as 244/16=14. Thanks for the help, much appreciated!

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