The following equations
:<math>3x+2y-z=1</math>:<math>2x-2y+4z=-2</math>:<math>-2x+y-2z=0</math>
form a system of three equations.
The following equations
form a system of three equations.
The following equations
{{NumBlk|:|<math>3x+2y-z=1</math>|1}}{{NumBlk|:|<math>2x-2y+4z=-2</math>|2}}{{NumBlk|:|<math>-2x+y-2z=0</math>|3}}
form a system of three equations.
The following equations
1
2
3
form a system of three equations.
The following equations
<divstyle="line-height: 0;">{{NumBlk|:|<math>3x+2y-z=1</math>|1}}{{NumBlk|:|<math>2x-2y+4z=-2</math>|2}}{{NumBlk|:|<math>-2x+y-2z=0</math>|3}}</div>
form a system of three equations.
The following equations
1
2
3
form a system of three equations.
The following equations
<divstyle="line-height: 0;">{{NumBlk||<math>3x+2y-z=1</math>|1}}{{NumBlk||<math>2x-2y+4z=-2</math>|2}}{{NumBlk||<math>-2x+y-2z=0</math>|3}}</div>
form a system of three equations.
The following equations
1
2
3
form a system of three equations.
The following equations
<divstyle="line-height: 0; margin-left: 1.6em;">{{NumBlk||<math>3x+2y-z=1</math>|1}}{{NumBlk||<math>2x-2y+4z=-2</math>|2}}{{NumBlk||<math>-2x+y-2z=0</math>|3}}</div>
form a system of three equations.
The following equations
:<math>3x+2y-z=1</math>::<math>2x-2y+4z=-2</math>:::<math>-2x+y-2z=0</math>
form a system of three equations.
The following equations
form a system of three equations.
The following equations
<divstyle="line-height: 0; margin-left: 1.6em;">{{NumBlk||<math>3x+2y-z=1</math>|1}}<divstyle="margin-left: 1.6em;">{{NumBlk||<math>2x-2y+4z=-2</math>|2}}<divstyle="margin-left: 1.6em;">{{NumBlk||<math>-2x+y-2z=0</math>|3}}</div></div></div>
form a system of three equations.
The following equations
1
2
3
form a system of three equations.
The following equations
<divstyle="line-height: 0;"><divstyle="margin-left: calc(1.6em * 1);">{{NumBlk||<math>3x+2y-z=1</math>|1}}</div><divstyle="margin-left: calc(1.6em * 2);">{{NumBlk||<math>2x-2y+4z=-2</math>|2}}</div><divstyle="margin-left: calc(1.6em * 3);">{{NumBlk||<math>-2x+y-2z=0</math>|3}}</div></div>
form a system of three equations.
<divstyle="line-height:0;">{{NumBlk|1=:|2=<math>a^2 + b^2 = (a + b i) (a - b i)</math>|3=1}}{{NumBlk|1=:|2=<math>a^2 - b^2 = (a + b) (a - b)</math>|3=2}}{{NumBlk|1=:|2=<math>e^{i x} = \cos x + i \sin x</math>|3=3}}{{NumBlk|1=:|2=<math>\sin^2 \theta + \cos^2 \theta = 1</math>|3=4}}{{NumBlk|1=:|2=<math>\sin(2 \theta) = 2 \sin\theta\cos\theta</math>|3=5}}</div>
Renders as
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Markup
<divstyle="line-height:0;">{{NumBlk|1=:|2=<math>a^2 + b^2 = (a + b i) (a - b i)</math>|3=1|LnSty=0.37ex dotted Gainsboro}}{{NumBlk|1=:|2=<math>a^2 - b^2 = (a + b) (a - b)</math>|3=2|LnSty=0.37ex dotted Gainsboro}}{{NumBlk|1=:|2=<math>e^{i x} = \cos x + i \sin x</math>|3=3|LnSty=0.37ex dotted Gainsboro}}{{NumBlk|1=:|2=<math>\sin^2 \theta + \cos^2 \theta = 1</math>|3=4|LnSty=0.37ex dotted Gainsboro}}{{NumBlk|1=:|2=<math>\sin(2 \theta) = 2 \sin\theta\cos\theta</math>|3=5|LnSty=0.37ex dotted Gainsboro}}</div>
Renders as
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Markup
<divstyle="line-height:0;">{{NumBlk|1=:|2=<math>a^2 + b^2 = (a + b i) (a - b i)</math>|3=1|LnSty=0.37ex dotted Gainsboro}}{{NumBlk|1=:|2=<math>a^2 - b^2 = (a + b) (a - b)</math>|3=2|LnSty=0.37ex none Gainsboro}}{{NumBlk|1=:|2=<math>e^{i x} = \cos x + i \sin x</math>|3=3|LnSty=0.37ex dotted Gainsboro}}{{NumBlk|1=:|2=<math>\sin^2 \theta + \cos^2 \theta = 1</math>|3=4|LnSty=0.37ex none Gainsboro}}{{NumBlk|1=:|2=<math>\sin(2 \theta) = 2 \sin\theta\cos\theta</math>|3=5|LnSty=0.37ex dotted Gainsboro}}</div>
Renders as
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Markup
<divstyle="line-height:0;"><divstyle="background-color: Beige;">{{NumBlk|1=:|2=<math>a^2 + b^2 = (a + b i) (a - b i)</math>|3=1}}</div><divstyle="background-color: none;">{{NumBlk|1=:|2=<math>a^2 - b^2 = (a + b) (a - b)</math>|3=2}}</div><divstyle="background-color: Beige;">{{NumBlk|1=:|2=<math>e^{i x} = \cos x + i \sin x</math>|3=3}}</div><divstyle="background-color: none;">{{NumBlk|1=:|2=<math>\sin^2 \theta + \cos^2 \theta = 1</math>|3=4}}</div><divstyle="background-color: Beige;">{{NumBlk|1=:|2=<math>\sin(2 \theta) = 2 \sin\theta\cos\theta</math>|3=5}}</div></div>
Renders as
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Markup
(mouse over the row you want to highlight)
{{row hover highlight}}{|class="hover-highlight"style="line-height:0; width: 100%; border-collapse: collapse; margin: 0; padding: 0;"|-|{{NumBlk|1=:|2=<math>a^2 + b^2 = (a + b i) (a - b i)</math>|3=1}}|-|{{NumBlk|1=:|2=<math>a^2 - b^2 = (a + b) (a - b)</math>|3=2}}|-|{{NumBlk|1=:|2=<math>e^{i x} = \cos x + i \sin x</math>|3=3}}|-|{{NumBlk|1=:|2=<math>\sin^2 \theta + \cos^2 \theta = 1</math>|3=4}}|-|{{NumBlk|1=:|2=<math>\sin(2 \theta) = 2 \sin\theta\cos\theta</math>|3=5}}|}
Renders as
(mouse over the row you want to highlight)
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Proof of hypothetical syllogism by constructive dilemma