DarthKeidran (talk | contribs) (Added IPA) Tags: Visual edit apiedit |
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==Relations With Trace== |
==Relations With Trace== |
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− | She has taken a great fondness of Trace, telling him things that he isn't supposed to know and risking her own life for him. Trace came back to her after leaving to find his friends so that she wouldn't be alone when she slept, partially because he couldn't find a way out of the cave. |
+ | She has taken a great fondness of Trace, telling him things that he isn't supposed to know and risking her own life for him. Trace came back to her after leaving to find his friends so that she wouldn't be alone when she slept, partially because he couldn't find a way out of the cave. Lady Nora has shown affection towards Trace. |
− | |||
− | ==Appearances== |
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− | {| border="1" cellpadding="1" cellspacing="1" style="width: 635px; height: 635px;" |
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− | |+Appearances of Nora in TwoKinds |
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− | |- |
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− | ! scope="row" | |
||
− | ! scope="row" |Pg |
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− | ! scope="col" |1 |
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− | ! scope="col" |2 |
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− | ! scope="col" |3 |
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− | ! scope="col" |4 |
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− | ! scope="col" |5 |
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− | ! scope="col" |6 |
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− | ! scope="col" |7 |
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− | ! scope="col" |8 |
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− | ! scope="col" |9 |
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− | ! scope="col" |0 |
||
− | |- |
||
− | ! scope="row" | [[Prologue]] |
||
− | ! scope="row" |0 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | |- |
||
− | ! scope="row" | [[Chapter 1]] |
||
− | ! scope="row" |0 |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | |N |
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− | |N |
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− | |N |
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− | |N |
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− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |10 |
||
− | |N |
||
− | |N |
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− | |N |
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− | |N |
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− | |N |
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− | |N |
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− | |N |
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− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | [[Chapter 2]] |
||
− | ! scope="row" |20 |
||
− | |N |
||
− | |N |
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− | |N |
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− | |N |
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− | |N |
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− | |N |
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− | |N |
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− | |N |
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− | |N |
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− | |N |
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− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |30 |
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− | |N |
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− | |N |
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− | |N |
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− | |N |
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− | |N |
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− | |N |
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− | |N |
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− | |N |
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− | |N |
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− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |40 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
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− | |N |
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− | |N |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | |- |
||
− | ! scope="row" | [[Chapter 3]] |
||
− | ! scope="row" |40 |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |50 |
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− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |60 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |70 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | |- |
||
− | ! scope="row" | [[Chapter 4]] |
||
− | ! scope="row" |70 |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | |N |
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− | |N |
||
− | |N |
||
− | |N |
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− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |80 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |90 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |Pg |
||
− | ! scope="col" |1 |
||
− | ! scope="col" |2 |
||
− | ! scope="col" |3 |
||
− | ! scope="col" |4 |
||
− | ! scope="col" |5 |
||
− | ! scope="col" |6 |
||
− | ! scope="col" |7 |
||
− | ! scope="col" |8 |
||
− | ! scope="col" |9 |
||
− | ! scope="col" |0 |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |100 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | |- |
||
− | ! scope="row" | [[Chapter 5]] |
||
− | ! scope="row" |100 |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |110 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |120 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |130 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |140 |
||
− | |N |
||
− | |N |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | |- |
||
− | ! scope="row" | [[Chapter 6 P1]] |
||
− | ! scope="row" |140 |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |150 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |160 |
||
− | |N |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | |- |
||
− | ! scope="row" | [[Chapter 6 P2]] |
||
− | ! scope="row" |160 |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |170 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |180 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |190 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | |- |
||
− | ! scope="row" | [[Chapter 7]] |
||
− | ! scope="row" |190 |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |Pg |
||
− | ! scope="col" |1 |
||
− | ! scope="col" |2 |
||
− | ! scope="col" |3 |
||
− | ! scope="col" |4 |
||
− | ! scope="col" |5 |
||
− | ! scope="col" |6 |
||
− | ! scope="col" |7 |
||
− | ! scope="col" |8 |
||
− | ! scope="col" |9 |
||
− | ! scope="col" |0 |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |200 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |210 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |220 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | | style="background-color: rgb(167, 210, 209);" |[http://twokinds.keenspot.com/archive.php?p=224 Y] |
||
− | | style="background-color: rgb(167, 210, 209);" |[http://twokinds.keenspot.com/archive.php?p=225 Y] |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | | style="background-color: rgb(167, 210, 209);" |[http://twokinds.keenspot.com/archive.php?p=229 Y] |
||
− | | style="background-color: rgb(167, 210, 209);" |[http://twokinds.keenspot.com/archive.php?p=230 Y] |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |230 |
||
− | |N |
||
− | | style="background-color: rgb(167, 210, 209);" |[http://twokinds.keenspot.com/archive.php?p=232 Y] |
||
− | |N |
||
− | | style="background-color: rgb(167, 210, 209);" |[http://twokinds.keenspot.com/archive.php?p=234 Y] |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | | style="background-color: rgb(167, 210, 209);" |[http://twokinds.keenspot.com/archive.php?p=240 Y] |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |240 |
||
− | | style="background-color: rgb(167, 210, 209);" |[http://twokinds.keenspot.com/archive.php?p=241 Y] |
||
− | |N |
||
− | | style="background-color: rgb(167, 210, 209);" |[http://twokinds.keenspot.com/archive.php?p=243 Y] |
||
− | | style="background-color: rgb(167, 210, 209);" |[http://twokinds.keenspot.com/archive.php?p=244 Y] |
||
− | |N |
||
− | |N |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | |- |
||
− | ! scope="row" | [[Chapter 8]] |
||
− | ! scope="row" |240 |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | |N |
||
− | | style="background-color: rgb(167, 210, 209);" |[http://twokinds.keenspot.com/archive.php?p=248 Y] |
||
− | | style="background-color: rgb(167, 210, 209);" |[http://twokinds.keenspot.com/archive.php?p=249 Y] |
||
− | | style="background-color: rgb(167, 210, 209);" |[http://twokinds.keenspot.com/archive.php?p=250 Y] |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |250 |
||
− | | style="background-color: rgb(167, 210, 209);" |[http://twokinds.keenspot.com/archive.php?p=251 Y] |
||
− | | style="background-color: rgb(167, 210, 209);" |[http://twokinds.keenspot.com/archive.php?p=252 Y] |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |260 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |270 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |280 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | |- |
||
− | ! scope="row" | [[Chapter 9]] |
||
− | ! scope="row" |280 |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |290 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |Pg |
||
− | ! scope="col" |1 |
||
− | ! scope="col" |2 |
||
− | ! scope="col" |3 |
||
− | ! scope="col" |4 |
||
− | ! scope="col" |5 |
||
− | ! scope="col" |6 |
||
− | ! scope="col" |7 |
||
− | ! scope="col" |8 |
||
− | ! scope="col" |9 |
||
− | ! scope="col" |0 |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |300 |
||
− | |N |
||
− | |N |
||
− | | style="background-color: rgb(167, 210, 209);" |[http://twokinds.keenspot.com/archive.php?p=303 Y] |
||
− | |N |
||
− | | style="background-color: rgb(167, 210, 209);" |[http://twokinds.keenspot.com/archive.php?p=305 Y] |
||
− | | style="background-color: rgb(167, 210, 209);" |[http://twokinds.keenspot.com/archive.php?p=306 Y] |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |310 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |320 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |330 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | | style="background-color: rgb(167, 210, 209);" |[http://twokinds.keenspot.com/archive.php?p=334 Y] |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |340 |
||
− | | style="background-color: rgb(167, 210, 209);" |[http://twokinds.keenspot.com/archive.php?p=341 Y] |
||
− | | style="background-color: rgb(167, 210, 209);" |[http://twokinds.keenspot.com/archive.php?p=342 Y] |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | |- |
||
− | ! scope="row" | [[Chapter 10]] |
||
− | ! scope="row" |340 |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |350 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | | style="background-color: rgb(167, 210, 209);" |[http://twokinds.keenspot.com/archive.php?p=357 Y] |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |360 |
||
− | | style="background-color: rgb(167, 210, 209);" |[http://twokinds.keenspot.com/archive.php?p=361 Y] |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |370 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |380 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |390 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | | style="background-color: rgb(167, 210, 209);" |[http://twokinds.keenspot.com/archive.php?p=395 Y] |
||
− | |N |
||
− | |N |
||
− | | style="background-color: rgb(167, 210, 209);" |[http://twokinds.keenspot.com/archive.php?p=398 Y] |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |Pg |
||
− | ! scope="col" |1 |
||
− | ! scope="col" |2 |
||
− | ! scope="col" |3 |
||
− | ! scope="col" |4 |
||
− | ! scope="col" |5 |
||
− | ! scope="col" |6 |
||
− | ! scope="col" |7 |
||
− | ! scope="col" |8 |
||
− | ! scope="col" |9 |
||
− | ! scope="col" |0 |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |400 |
||
− | |N |
||
− | | style="background-color: rgb(167, 210, 209);" |[http://twokinds.keenspot.com/archive.php?p=402 Y] |
||
− | | style="background-color: rgb(167, 210, 209);" |[http://twokinds.keenspot.com/archive.php?p=403 Y] |
||
− | |N |
||
− | | style="background-color: rgb(167, 210, 209);" |[http://twokinds.keenspot.com/archive.php?p=405 Y] |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | | style="background-color: rgb(167, 210, 209);" |[http://twokinds.keenspot.com/archive.php?p=409 Y] |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |410 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |420 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |430 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |440 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | |- |
||
− | ! scope="row" | [[Chapter 11]] |
||
− | ! scope="row" |440 |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |450 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |460 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |470 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |480 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |490 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |Pg |
||
− | ! scope="col" |1 |
||
− | ! scope="col" |2 |
||
− | ! scope="col" |3 |
||
− | ! scope="col" |4 |
||
− | ! scope="col" |5 |
||
− | ! scope="col" |6 |
||
− | ! scope="col" |7 |
||
− | ! scope="col" |8 |
||
− | ! scope="col" |9 |
||
− | ! scope="col" |0 |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |500 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |510 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |520 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | |- |
||
− | ! scope="row" | [[Chapter 12]] |
||
− | ! scope="row" |520 |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |530 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |540 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |550 |
||
− | | style="background-color: rgb(167, 210, 209);" |[http://twokinds.keenspot.com/archive.php?p=551 Y] |
||
− | | style="background-color: rgb(167, 210, 209);" |[http://twokinds.keenspot.com/archive.php?p=552 Y] |
||
− | | style="background-color: rgb(167, 210, 209);" |[http://twokinds.keenspot.com/archive.php?p=553 Y] |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |560 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | | style="background-color: rgb(167, 210, 209);" |[http://twokinds.keenspot.com/archive.php?p=570 Y] |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |570 |
||
− | | style="background-color: rgb(167, 210, 209);" |[http://twokinds.keenspot.com/archive.php?p=571 Y] |
||
− | | style="background-color: rgb(167, 210, 209);" |[http://twokinds.keenspot.com/archive.php?p=572 Y] |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |580 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | | style="background-color: rgb(167, 210, 209);" |[http://twokinds.keenspot.com/archive.php?p=584 Y] |
||
− | | style="background-color: rgb(167, 210, 209);" |[http://twokinds.keenspot.com/archive.php?p=585 Y] |
||
− | | style="background-color: rgb(167, 210, 209);" |[http://twokinds.keenspot.com/archive.php?p=586 Y] |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |590 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | |- |
||
− | ! scope="row" | [[Chapter 13]] |
||
− | ! scope="row" |590 |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |Pg |
||
− | ! scope="col" |1 |
||
− | ! scope="col" |2 |
||
− | ! scope="col" |3 |
||
− | ! scope="col" |4 |
||
− | ! scope="col" |5 |
||
− | ! scope="col" |6 |
||
− | ! scope="col" |7 |
||
− | ! scope="col" |8 |
||
− | ! scope="col" |9 |
||
− | ! scope="col" |0 |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |600 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |610 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | |- |
||
− | ! scope="row" | [[Chapter 14]] |
||
− | ! scope="row" |610 |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | | style="background-color: rgb(170, 170, 170);" | |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |620 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |630 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |640 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |- |
||
− | ! scope="row" | |
||
− | ! scope="row" |650 |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
− | |N |
||
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==References== |
==References== |
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[[ru:Леди Нора]] |
[[ru:Леди Нора]] |
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[[Category:Characters]] |
[[Category:Characters]] |
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+ | [[Category:Female Characters]] |
Revision as of 12:52, 13 July 2018
Lady Nora (IPA(key) /leɪ'di nɔr'ə/) is a dragon that is snow white in color. She is rather gentle in contrast to her counterparts in dragon mythology, but has jokingly said to have eaten people. She is very close with Trace Legacy.
From the Author[1]
Personality
"Nora enjoys meddling in the affairs of mortals."
Biography
"Lady Nora is a little over 20 centuries old, making her one of the oldest and largest dragons of her time. Unlike most dragons, who take little interest in mortals, she enjoys watching Humans, Keidran, and Basitin feud with one another. She will usually only interfere with them to see what might happen. Nora can shape-shift, but she has trouble balancing on two legs. Because of this, she generally only shapeshifts into other four-legged animals, and rarely shapeshifts into a humanoid form."
History
She has hosted the Dragon Masquerade at least once and possibly created a Dragon Mask. She kept watch over Trace and even helped him on a few occasions. While flying around one day she stumbled upon Orchard Valley. She promised to the inhabitants that she would only tell the locations to the right people. She told it to Trace when she found he was in love with Flora. She also helped him survive the tower explosion, but was drained of her mana, causing her to enter a long sleep after healing his wounds.
Relations With Trace
She has taken a great fondness of Trace, telling him things that he isn't supposed to know and risking her own life for him. Trace came back to her after leaving to find his friends so that she wouldn't be alone when she slept, partially because he couldn't find a way out of the cave. Lady Nora has shown affection towards Trace.
References
Appearances
Appearances of Lady Nora
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Characters of Twokinds
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