00:01
It is given that the colored candies, colored candies are in this particular ratio, which is 13 % are brown and 14 % are yellow of the total.
00:22
The 13 % will be red and 24 % will be blue, 20 % will be blue, 20 % will be of the total.
00:32
Orange and the 16 percentage are green.
00:38
So here it's zero can be considered as the bag of the bag of colored candies.
00:55
The bag of colored candies are distributed as above.
01:04
Distributed as we stated.
01:06
As we stated.
01:08
As we or we can say that general the data the data is a good fit to the theory.
01:25
Theory means here as given above status above data is a good fit to the theory.
01:30
And we are asked to do this test at a level of significance 0 .105 and it is clear that we use sky square test for goodness of fit.
01:46
This is kai square test of goodness of fist.
01:51
And we can see that the critical value, kai square critical is level of significance is 0 .0.
01:58
And the degrees of freedom will be n minus 1, which means that kai square critical, which is 0 .0 5, and degrees of freedom is 6 minus 1.
02:09
1.
02:10
And on calculation, the answer is 11 .1 0 .5.
02:18
The table value is also shown here.
02:21
Now, we have to calculate the first statistic.
02:26
For that, let's make a table.
02:29
Observed and you can make an accepted frequencies of the corresponding data set.
02:36
So this will be out of 7.
02:38
It is brown colored candies, yellow, red, blue, orange, and green.
02:47
These are the different categories.
02:49
And it is given that brown colored candies are 59, these are 606, this are 54, then 61, 90, and 60...