2.2 Übungen

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Zeile 21: Zeile 21:
|| <math>5x+7=2x-6</math>
|| <math>5x+7=2x-6</math>
|}
|}
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</div>{{#NAVCONTENT:Svar|Svar 2.2:1|Lösning a|Lösning 2.2:1a|Lösning b|Lösning 2.2:1b|Lösning c|Lösning 2.2:1c|Lösning d|Lösning 2.2:1d}}
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</div>{{#NAVCONTENT:Answer|Svar 2.2:1|Solution a|Lösning 2.2:1a|Solution b|Lösning 2.2:1b|Solution c|Lösning 2.2:1c|Solution d|Lösning 2.2:1d}}
===Exercise 2.2:2===
===Exercise 2.2:2===
Zeile 37: Zeile 37:
|| <math>(x^2+4x+1)^2+3x^4-2x^2=(2x^2+2x+3)^2</math>
|| <math>(x^2+4x+1)^2+3x^4-2x^2=(2x^2+2x+3)^2</math>
|}
|}
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</div>{{#NAVCONTENT:Svar|Svar 2.2:2|Lösning a|Lösning 2.2:2a|Lösning b|Lösning 2.2:2b|Lösning c|Lösning 2.2:2c|Lösning d|Lösning 2.2:2d}}
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</div>{{#NAVCONTENT:Answer|Svar 2.2:2|Solution a|Lösning 2.2:2a|Solution b|Lösning 2.2:2b|Solution c|Lösning 2.2:2c|Solution d|Lösning 2.2:2d}}
===Exercise 2.2:3===
===Exercise 2.2:3===
Zeile 55: Zeile 55:
|| <math>\left(\displaystyle\frac{2}{x}-3\right)\left(\displaystyle\frac{1}{4x}+\frac{1}{2}\right)-\left(\displaystyle\frac{1}{2x}-\frac{2}{3}\right)^2-\left(\displaystyle\frac{1}{2x}+\frac{1}{3}\right)\left(\displaystyle\frac{1}{2x}-\frac{1}{3}\right)=0</math>
|| <math>\left(\displaystyle\frac{2}{x}-3\right)\left(\displaystyle\frac{1}{4x}+\frac{1}{2}\right)-\left(\displaystyle\frac{1}{2x}-\frac{2}{3}\right)^2-\left(\displaystyle\frac{1}{2x}+\frac{1}{3}\right)\left(\displaystyle\frac{1}{2x}-\frac{1}{3}\right)=0</math>
|}
|}
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</div>{{#NAVCONTENT:Svar|Svar 2.2:3|Lösning a|Lösning 2.2:3a|Lösning b|Lösning 2.2:3b|Lösning c|Lösning 2.2:3c|Lösning d|Lösning 2.2:3d}}
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</div>{{#NAVCONTENT:Answer|Svar 2.2:3|Solution a|Lösning 2.2:3a|Solution b|Lösning 2.2:3b|Solution c|Lösning 2.2:3c|Solution d|Lösning 2.2:3d}}
===Exercise 2.2:4===
===Exercise 2.2:4===
Zeile 61: Zeile 61:
{| width="100%" cellspacing="10px"
{| width="100%" cellspacing="10px"
|a)
|a)
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|width="100%" | Write the equation for the line <math>\,y=2x+3\,</math> in the form <math>\,ax+by=c\,</math>
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|width="100%" | Write the equation for the line <math>\,y=2x+3\,</math> in the form <math>\,ax+by=c\,</math>.
|-
|-
|b)
|b)
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|| Write the equation for the line <math> 3x+4y-5=0</math> in the form <math>\,y=kx+m\,</math>
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|| Write the equation for the line <math> 3x+4y-5=0</math> in the form <math>\,y=kx+m\,</math>.
|}
|}
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</div>{{#NAVCONTENT:Svar|Svar 2.2:4|Lösning a|Lösning 2.2:4a|Lösning b|Lösning 2.2:4b}}
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</div>{{#NAVCONTENT:Answer|Svar 2.2:4|Solution a|Lösning 2.2:4a|Solution b|Lösning 2.2:4b}}
===Exercise 2.2:5===
===Exercise 2.2:5===
Zeile 72: Zeile 72:
{| width="100%" cellspacing="10px"
{| width="100%" cellspacing="10px"
|a)
|a)
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|width="100%" | Determine the equation for the straight line that goes between the points <math>\,(2,3)\,</math> and<math>\,(3,0)\,</math>
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|width="100%" | Determine the equation for the straight line that goes between the points <math>\,(2,3)\,</math> and<math>\,(3,0)\,</math>.
|-
|-
|b)
|b)
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|| Determine the equation for the straight line that has gradient <math>\,-3\,</math> and goes through the point <math>\,(1,-2)\,</math>
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|| Determine the equation for the straight line that has slope <math>\,-3\,</math> and goes through the point <math>\,(1,-2)\,</math>.
|-
|-
|c)
|c)
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|| Determine the equation for the straight line that goes through the point <math>\,(-1,2)\,</math> and is parallel to the line <math>\,y=3x+1\,</math>
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|| Determine the equation for the straight line that goes through the point <math>\,(-1,2)\,</math> and is parallel to the line <math>\,y=3x+1\,</math>.
|-
|-
|d)
|d)
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||Determine the equation for the straight line that goes through the point <math>\,(2,4)\,</math> and is perpendicular to the line <math>\,y=2x+5\,</math>
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||Determine the equation for the straight line that goes through the point <math>\,(2,4)\,</math> and is perpendicular to the line <math>\,y=2x+5\,</math>.
|-
|-
|e)
|e)
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|| Determine the slope, <math>\,k\,</math> for the straight line that cuts the ''x''-axis at the point <math>\,(5,0)\,</math> and ''y''-axis at the point <math>\,(0,-8)\,</math>
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|| Determine the slope, <math>\,k\,</math>, for the straight line that cuts the ''x''-axis at the point <math>\,(5,0)\,</math> and ''y''-axis at the point <math>\,(0,-8)\,</math>.
|}
|}
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</div>{{#NAVCONTENT:Svar|Svar 2.2:5|Lösning a|Lösning 2.2:5a|Lösning b|Lösning 2.2:5b|Lösning c|Lösning 2.2:5c|Lösning d|Lösning 2.2:5d|Lösning e|Lösning 2.2:5e}}
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</div>{{#NAVCONTENT:Answer|Svar 2.2:5|Solution a|Lösning 2.2:5a|Solution b|Lösning 2.2:5b|Solution c|Lösning 2.2:5c|Solution d|Lösning 2.2:5d|Solution e|Lösning 2.2:5e}}
===Exercise 2.2:6===
===Exercise 2.2:6===
Zeile 93: Zeile 93:
{| width="100%" cellspacing="10px"
{| width="100%" cellspacing="10px"
|a)
|a)
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|width="50%" | <math>y=3x+5\ </math> och ''x''-axeln
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|width="50%" | <math>y=3x+5\ </math> and ''x''-axeln
|b)
|b)
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|width="50%" | <math>y=-x+5\ </math> och ''y''-axeln
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|width="50%" | <math>y=-x+5\ </math> and ''y''-axeln
|-
|-
|c)
|c)
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|width="50%" | <math>4x+5y+6=0\ </math> och ''y''-axeln
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|width="50%" | <math>4x+5y+6=0\ </math> and ''y''-axeln
|d)
|d)
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|| <math>x+y+1=0\ </math> och <math>\ x=12</math>
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|| <math>x+y+1=0\ </math> and <math>\ x=12</math>
|-
|-
|e)
|e)
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|| <math>2x+y-1=0\ </math> och <math>\ y-2x-2=0</math>
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|| <math>2x+y-1=0\ </math> and <math>\ y-2x-2=0</math>
|}
|}
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</div>{{#NAVCONTENT:Svar|Svar 2.2:6|Lösning a|Lösning 2.2:6a|Lösning b|Lösning 2.2:6b|Lösning c|Lösning 2.2:6c|Lösning d|Lösning 2.2:6d|Lösning e|Lösning 2.2:6e}}
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</div>{{#NAVCONTENT:Answer|Svar 2.2:6|Solution a|Lösning 2.2:6a|Solution b|Lösning 2.2:6b|Solution c|Lösning 2.2:6c|Solution d|Lösning 2.2:6d|Solution e|Lösning 2.2:6e}}
===Exercise 2.2:7===
===Exercise 2.2:7===
Zeile 118: Zeile 118:
|width="33%" | <math>f(x)=2</math>
|width="33%" | <math>f(x)=2</math>
|}
|}
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</div>{{#NAVCONTENT:Svar|Svar 2.2:7|Lösning a|Lösning 2.2:7a|Lösning b|Lösning 2.2:7b|Lösning c|Lösning 2.2:7c}}
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</div>{{#NAVCONTENT:Answer|Svar 2.2:7|Solution a|Lösning 2.2:7a|Solution b|Lösning 2.2:7b|Solution c|Lösning 2.2:7c}}
===Exercise 2.2:8===
===Exercise 2.2:8===
<div class="ovning">
<div class="ovning">
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In the ''xy''-plane, draw in all the points whose coordinates <math>\,(x,y)\,</math> satisfy
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In the ''xy''-plane, fill in all the points whose coordinates <math>\,(x,y)\,</math> satisfy
{| width="100%" cellspacing="10px"
{| width="100%" cellspacing="10px"
|a)
|a)
Zeile 131: Zeile 131:
|width="33%" | <math>2x+3y \leq 6 </math>
|width="33%" | <math>2x+3y \leq 6 </math>
|}
|}
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</div>{{#NAVCONTENT:Svar|Svar 2.2:8|Lösning a|Lösning 2.2:8a|Lösning b|Lösning 2.2:8b|Lösning c|Lösning 2.2:8c}}
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</div>{{#NAVCONTENT:Answer|Svar 2.2:8|Solution a|Lösning 2.2:8a|Solution b|Lösning 2.2:8b|Solution c|Lösning 2.2:8c}}
===Exercise 2.2:9===
===Exercise 2.2:9===
Zeile 146: Zeile 146:
|| is described by the inequalities <math>\ x+y \geq -2\,</math>, <math>\ 2x-y \leq 2\ </math> and <math>\ 2y-x \leq 2\,</math>.
|| is described by the inequalities <math>\ x+y \geq -2\,</math>, <math>\ 2x-y \leq 2\ </math> and <math>\ 2y-x \leq 2\,</math>.
|}
|}
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</div>{{#NAVCONTENT:Svar|Svar 2.2:9|Lösning a|Lösning 2.2:9a|Lösning b|Lösning 2.2:9b|Lösning c|Lösning 2.2:9c}}
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</div>{{#NAVCONTENT:Answer|Svar 2.2:9|Solution a|Lösning 2.2:9a|Solution b|Lösning 2.2:9b|Solution c|Lösning 2.2:9c}}

Version vom 14:18, 18. Aug. 2008

 

Vorlage:Ej vald flik Vorlage:Vald flik

 

Exercise 2.2:1

Solve the equations

a) \displaystyle x-2=-1 b) \displaystyle 2x+1=13
c) \displaystyle \displaystyle\frac{1}{3}x-1=x d) \displaystyle 5x+7=2x-6

Exercise 2.2:2

Solve the equations

a) \displaystyle \displaystyle\frac{5x}{6}-\displaystyle\frac{x+2}{9}=\displaystyle\frac{1}{2} b) \displaystyle \displaystyle\frac{8x+3}{7}-\displaystyle\frac{5x-7}{4}=2
c) \displaystyle (x+3)^2-(x-5)^2=6x+4 d) \displaystyle (x^2+4x+1)^2+3x^4-2x^2=(2x^2+2x+3)^2

Exercise 2.2:3

Solve the equations

a) \displaystyle \displaystyle\frac{x+3}{x-3}-\displaystyle\frac{x+5}{x-2}=0
b) \displaystyle \displaystyle\frac{4x}{4x-7}-\displaystyle\frac{1}{2x-3}=1
c) \displaystyle \left(\displaystyle\frac{1}{x-1}-\frac{1}{x+1}\right)\left(x^2+\frac{1}{2}\right)=\displaystyle\frac{6x-1}{3x-3}
d) \displaystyle \left(\displaystyle\frac{2}{x}-3\right)\left(\displaystyle\frac{1}{4x}+\frac{1}{2}\right)-\left(\displaystyle\frac{1}{2x}-\frac{2}{3}\right)^2-\left(\displaystyle\frac{1}{2x}+\frac{1}{3}\right)\left(\displaystyle\frac{1}{2x}-\frac{1}{3}\right)=0

Exercise 2.2:4

a) Write the equation for the line \displaystyle \,y=2x+3\, in the form \displaystyle \,ax+by=c\,.
b) Write the equation for the line \displaystyle 3x+4y-5=0 in the form \displaystyle \,y=kx+m\,.

Exercise 2.2:5

a) Determine the equation for the straight line that goes between the points \displaystyle \,(2,3)\, and\displaystyle \,(3,0)\,.
b) Determine the equation for the straight line that has slope \displaystyle \,-3\, and goes through the point \displaystyle \,(1,-2)\,.
c) Determine the equation for the straight line that goes through the point \displaystyle \,(-1,2)\, and is parallel to the line \displaystyle \,y=3x+1\,.
d) Determine the equation for the straight line that goes through the point \displaystyle \,(2,4)\, and is perpendicular to the line \displaystyle \,y=2x+5\,.
e) Determine the slope, \displaystyle \,k\,, for the straight line that cuts the x-axis at the point \displaystyle \,(5,0)\, and y-axis at the point \displaystyle \,(0,-8)\,.

Exercise 2.2:6

Find the points of intersection between the pairs of lines in the following

a) \displaystyle y=3x+5\ and x-axeln b) \displaystyle y=-x+5\ and y-axeln
c) \displaystyle 4x+5y+6=0\ and y-axeln d) \displaystyle x+y+1=0\ and \displaystyle \ x=12
e) \displaystyle 2x+y-1=0\ and \displaystyle \ y-2x-2=0

Exercise 2.2:7

Sketch the graph of the functions

a) \displaystyle f(x)=3x-2 b) \displaystyle f(x)=2-x c) \displaystyle f(x)=2

Exercise 2.2:8

In the xy-plane, fill in all the points whose coordinates \displaystyle \,(x,y)\, satisfy

a) \displaystyle y \geq x b) \displaystyle y < 3x -4 c) \displaystyle 2x+3y \leq 6

Exercise 2.2:9

Calculate the area of the triangle which

a) has corners at the points \displaystyle \,(1,4)\,, \displaystyle \,(3,3)\, and \displaystyle \,(1,0)\,.
b) is bordered by the lines \displaystyle \ x=2y\,, \displaystyle \ y=4\ and \displaystyle \ y=10-2x\,.
c) is described by the inequalities \displaystyle \ x+y \geq -2\,, \displaystyle \ 2x-y \leq 2\ and \displaystyle \ 2y-x \leq 2\,.