Post by lg on May 5, 2024 21:05:04 GMT
Hi everyone,
Can anyone help me to setup the Stroop code in a way that allows the number of congruent and incongruent colour word matches to be equal? I have updated the code table to add more congruent options at the end (final 6 rows) to allow for equal number of congruent and incongruent options. That being said, when I run the experiment there are not a consistent number of congruent and incongruent trials offered. Any insight you have would be appreciated.
p.s., there are 40 trials, but I'm wondering if I reduced the # trials to 24 (to match the number of rows in the table below) if that would do it. Either way I'd still like to know how to do it with 40 trials.
table stroop
"yellow yellow 1" yellowyellow 4
"yellow green 0" yellowgreen 2
"yellow blue 0" yellowblue 3
"yellow red 0" yellowred 1
"red yellow 0" redyellow 4
"red green 0" redgreen 2
"red blue 0" redblue 3
"red red 1" redred 1
"green yellow 0" greenyellow 4
"green green 1" greengreen 2
"green blue 0" greenblue 3
"green red 0" greenred 1
"blue yellow 0" blueyellow 4
"blue green 0" bluegreen 2
"blue blue 1" blueblue 3
"blue red 0" bluered 1
"yellow yellow 1" yellowyellow 4
"yellow yellow 1" yellowyellow 4
"red red 1" redred 1
"red red 1" redred 1
"green green 1" greengreen 2
"green green 1" greengreen 2
"blue blue 1" blueblue 3
"blue blue 1" blueblue 3
Can anyone help me to setup the Stroop code in a way that allows the number of congruent and incongruent colour word matches to be equal? I have updated the code table to add more congruent options at the end (final 6 rows) to allow for equal number of congruent and incongruent options. That being said, when I run the experiment there are not a consistent number of congruent and incongruent trials offered. Any insight you have would be appreciated.
p.s., there are 40 trials, but I'm wondering if I reduced the # trials to 24 (to match the number of rows in the table below) if that would do it. Either way I'd still like to know how to do it with 40 trials.
table stroop
"yellow yellow 1" yellowyellow 4
"yellow green 0" yellowgreen 2
"yellow blue 0" yellowblue 3
"yellow red 0" yellowred 1
"red yellow 0" redyellow 4
"red green 0" redgreen 2
"red blue 0" redblue 3
"red red 1" redred 1
"green yellow 0" greenyellow 4
"green green 1" greengreen 2
"green blue 0" greenblue 3
"green red 0" greenred 1
"blue yellow 0" blueyellow 4
"blue green 0" bluegreen 2
"blue blue 1" blueblue 3
"blue red 0" bluered 1
"yellow yellow 1" yellowyellow 4
"yellow yellow 1" yellowyellow 4
"red red 1" redred 1
"red red 1" redred 1
"green green 1" greengreen 2
"green green 1" greengreen 2
"blue blue 1" blueblue 3
"blue blue 1" blueblue 3