Special cases and exercises.
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Simple equations: Special cases and exercises. |
| 3rd year of secondary education. | |
| Equations without solutions | ||
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Exercise 7
Solve
the following equations in your exercise book:
a)
x-3 = 2+x.
b)
x/2 = 1 - x + 3x/2
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In the first example you should find that 0 = 5 and in the second that 0 = 2. What does this mean? Obviously both equations cannot be true, regardless of the value of x. We can say that in such cases the equation doesn't have a solution. But what does this mean from a graphical point of view? If we make the RHS of both equations equal to 0 and we simplify them as much as possible we get -5 = 0 and -2 = 0. As you can see, x "disappears" which is the same as saying that in the equation mx + c= 0, "m = 0". | ||
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In this window we can see the position of the straight line when m = 0, c = -5, as in equation a). | ||
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The straight lines are always parallel to the X-axis in all cases! Therefore, the line doesn't cut the X-axis. This means that: there is no solution to the equation | ||
| Equations which have infinite solutions. | |
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Exercise 8
Solve the following equations in your exercise book:
a) 2x-1 = 3x + 3 - x - 4
b) x/2 - x/3 = x/6
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You should have found that in both cases 0 = 0 but what does this mean? Both sides of the equation are equal to each other but we have got rid of x. So what is the solution of the equation? If both sides of the equation are equal then they will be for any value of x! Prove it by substituting whichever value you want for x into either of the equations. | |
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Go back to the window above and put in the following values: a = 0 y b = 0. The straight line which is produced coincides exactly with the X-axis so we can therefore say that it "cuts" the X-axis at infinite points, i.e. for all values of x. | |
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In this case we can say that the equation has: infinite solutions or that it is an identity. |
| Solving problems with equations. | |
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One of the most important uses for these equations is to solve everyday problems. For instance: Exercise 9 There are three brothers in a family. The eldest brother is 4 years older than the middle brother, who is 3 years older than the youngest brother. When their ages are added together they are as old as their father, who is 40. How old is each brother? In order to solve these kind of problems we have to find an unknown factor and call it "x". In this example we shall call x: x = the age of the youngest brother. Then we write an equation using all the information included in the problem. Therefore: The age of the middle brother = x + 3; The age of the eldest brother = x + 3 + 4 = x + 7. The equation: The sum of the brothers' ages = 40; x + x+3 + x+7 = 40, If we solve the equation we get x = 10, therefore the solution to the problem is: The brothers are 10, 13 and 17 years old. You can also see the solution in the following window. | |
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Form a new equation and solve the following problem both numerically and
graphically, if you wish, in this window:
Exercise 10
There
are 20 questions in an exam. Each question answered correctly is awarded 3 marks
and 2 marks are lost for each question answered incorrectly. If a student gets a
total of 30 marks in the exam how many questions did he answer correctly and how
many incorrectly? | |
| Final exercises. | ||
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Solve the following equations and problems in your exercise book. Then, check your answers in the following window. | ||
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Exercise 11
Solve the following equations:
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Exercise 12
Solve the following problems:
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| Leoncio Santos Cuervo | ||
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| Spanish Ministry of Education. Year 2001 | ||
Except where otherwise noted, this work is licensed under a Creative Common License
