|
Kuder-Richardson #21 Formula
Good morning.
I am tring to adapt the Kuder-Richardson #21 Formula to excel. I appologize for linking the file to this post but I could not seem to get the formts right for the formula. Basically the formula is used to estimate test reliability. I can solve this long hand but would like an excel formala to help me. Suppose we gave a 50 item test and the mean was 43 and the variance was 25.0. R =test reliability k = number of items on the test X = mean of the raw scores of the total test S = the variance of the raw test scores from the total test R = ( k ) (1- X(k - X)) ---- ----------- k-1 kS R = (50) (1- 43(50-43) ---- ----------- 50-1 (50)(25) R = (1.02) (1- 301) ----- 1250 Solve R: R = (1.02) (0.76) = 0.78 Thank you in advance! PJ http://www.savefile.com/projects/808560688 |
Kuder-Richardson #21 Formula
pkaraffa,
Let set some ground rules: R is in Column H Row 1, k is in Column I Row 1, X is in Column J Row1, S is in Column K Row 1. Values to be entered into Row 2 of the above Columns, without "". "=(I2/(I@-1)*(((1-(J2*(I2-J2))/(I2*K2)))))" in H2 "50" in I2 "43" in J2 "25" in K2 The answer I got was 0.774694. hth Dennis " wrote: Good morning. I am tring to adapt the Kuder-Richardson #21 Formula to excel. I appologize for linking the file to this post but I could not seem to get the formts right for the formula. Basically the formula is used to estimate test reliability. I can solve this long hand but would like an excel formala to help me. Suppose we gave a 50 item test and the mean was 43 and the variance was 25.0. R =test reliability k = number of items on the test X = mean of the raw scores of the total test S = the variance of the raw test scores from the total test R = ( k ) (1- X(k - X)) ---- ----------- k-1 kS R = (50) (1- 43(50-43) ---- ----------- 50-1 (50)(25) R = (1.02) (1- 301) ----- 1250 Solve R: R = (1.02) (0.76) = 0.78 Thank you in advance! PJ http://www.savefile.com/projects/808560688 |
Kuder-Richardson #21 Formula
On Nov 4, 3:19 pm, FloMM2 wrote:
pkaraffa, Let set some ground rules: R is in Column H Row 1, k is in Column I Row 1, X is in Column J Row1, S is in Column K Row 1. Values to be entered into Row 2 of the above Columns, without "". "=(I2/(I@-1)*(((1-(J2*(I2-J2))/(I2*K2)))))" in H2 "50" in I2 "43" in J2 "25" in K2 The answer I got was 0.774694. hth Dennis " wrote: Good morning. I am tring to adapt the Kuder-Richardson #21 Formula to excel. I appologize for linking the file to this post but I could not seem to get the formts right for the formula. Basically the formula is used to estimate test reliability. I can solve this long hand but would like an excel formala to help me. Suppose we gave a 50 item test and the mean was 43 and the variance was 25.0. R =test reliability k = number of items on the test X = mean of the raw scores of the total test S = the variance of the raw test scores from the total test R = ( k ) (1- X(k - X)) ---- ----------- k-1 kS R = (50) (1- 43(50-43) ---- ----------- 50-1 (50)(25) R = (1.02) (1- 301) ----- 1250 Solve R: R = (1.02) (0.76) = 0.78 Thank you in advance! PJ http://www.savefile.com/projects/808560688- Hide quoted text - - Show quoted text - So did I. I just rounded up 0.774694 to 0.775 in which I rounded up the 5 to make it 78 that's it. |
| All times are GMT +1. The time now is 06:25 PM. |
Powered by vBulletin® Copyright ©2000 - 2025, Jelsoft Enterprises Ltd.
ExcelBanter.com