Answer:
Check the explanation
Step-by-step explanation:
Let X denotes steel ball and Y denotes diamond
[tex]\bar{x_1}[/tex] = 1/9( 50+57+......+51+53)
=530/9
=58.89
[tex]\bar{x_2}[/tex]= 1/9( 52+ 56+....+ 51+ 56)
=543/9
=60.33
difference = d =(60.33- 58.89)
=1.44
[tex]s^2=1/n\sum xi^2 - n/(n-1)\bar{x}^2[/tex]
s12 = 1/9( 502+572+......+512+532) -9/8 (58.89)2
=31686/8 - 9/8( 3468.03)
=3960.75 - 3901.53
=59.22
s1 = 7.69
s22 = 1/9( 522+ 562+....+ 512+ 562) -9/8 (60.33)2
=33295/8 - 9/8 (3640.11)
=4161.875 - 4095.12
=66.75
s2 =8.17
sample standard deviation for difference is
s=[tex]\sqrt{[(n1-1)s_1^2+ (n2-1)s_2^2]/(n1+n2-2)}[/tex]
= [tex]\sqrt{[(9-1)*59.22+ (9-1)*66.75]/(9+9-2)}[/tex]
= [tex]\sqrt{1007.76/16}[/tex]
=7.93
sd = [tex]s*\sqrt{(1/n1)+(1/n2)}[/tex]
=[tex]7.93*\sqrt{(1/9)+(1/9)}[/tex]
=7.93* 0.47
=3.74
For 95% confidence level [tex]Z (\alpha /2)[/tex] =1.96
confidence interval is
[tex]d\pm Z(\alpha /2)*s_d[/tex]
=(1.44 - 1.96* 3.75 , 1.44+1.96* 3.75)
=(1.44 - 7.35 , 1.44 + 7.35)
=(-2.31, 8.79)
There is sufficient evidence to conclude that the two indenters produce different hardness readings.
