Answer to Question #129625 in Statistics and Probability for sonu

Question

Answer to Question #129625 in Statistics and Probability for sonu

Question #129625

The life of a 60- watt light bulb in hours is known to be normally distributed with σ = 25
hours. Create 5 different random samples of 100 bulbs each which has a mean life of x_bar ~
1000 hours and perform one-way ANOVA with state it.

In this problem how the value is getting ∑X ij =499712
∑Xij^2 =499691630

please explain this to me sir

Expert's answer

The total sample size is "N=500." Therefore, the total degrees of freedom are:

"df_{total}=500-1=499"

The between-groups degrees of freedom are "df_{between}=5-1=4," and the within-groups degrees of freedom are:

"df_{within}=df_{total}-df_{between}=499-4=495"

"\\begin{matrix}\n Sum= & 99645 & 99684 & 99687 & 99699 & 99592 \\\\\n Average= & 996.45 & 996.84 & 996.87 & 996.99 & 995.92\n\\end{matrix}"

"\\begin{matrix}\n \\displaystyle\\sum_{i}X_{ij}^2= \\\\\n 99313355 & 99390488 & 99397147 & 99420471 & 99420471\n\\end{matrix}"

"\\begin{matrix}\n \\displaystyle St.Dev.= \\\\\n 14.939 & 14.733 & 14.964 & 14.759 & 10.249\n\\end{matrix}"

"SS_i=(n_i-1)s_i^2"

"(100-1)14.939^2=22094.75"

"(100-1)14.733^2=21489.44"

"(100-1)14.964^2=22167.31"

"(100-1)14.759^2=21564.99"

"(100-1)10.249^2=10399.36"

"\\begin{matrix}\n \\displaystyle SS= \\\\\n 22094.75 & 21489.44 & 22167.31 & 21564.99 & 10399.36\n\\end{matrix}"

"\\begin{matrix}\n n= & 100 & 100 & 100 & 100 & 100 \\\\\n\\end{matrix}"

"\\displaystyle\\sum_{i,j}X_{ij}="

"=99645 +99684 + 99687 + 99699 + 99592="

"=498307"

"\\displaystyle\\sum_{i,j}X_{ij}^2="

"=99313355+ 99390488 + 99397147+99420471 + 99420471="

"=496717525"

"SS_{total}=\\displaystyle\\sum_{i,j}X_{ij}^2-\\dfrac{1}{N}(\\displaystyle\\sum_{i,j}X_{ij})^2=97792.502""SS_{within}=22094.75 + 21489.44 +22167.31+""+21564.99+ 10399.36=97715.85""SS_{between}=\\displaystyle\\sum_{j}n_j(\\bar{x}_j-\\bar{\\bar{x}})^2=76.652""\u200b""MS_{between}=\\dfrac{SS_{between}}{df_{between}}=\\dfrac{76.652}{4}=19.163""MS_{within}=\\dfrac{SS_{within}}{df_{within}}=\\dfrac{97715.85}{495}=197.406""F=\\dfrac{MS_{between}}{MS_{within}}=\\dfrac{19.163}{197.406}=0.097"

The following null and alternative hypotheses need to be tested:

"H_0: \\mu_1=\\mu_2=\\mu_3=\\mu_4=\\mu_5"

"H_1:" Not all means are equal.

The above hypotheses will be tested using an F-ratio for a One-Way ANOVA.

Based on the information provided, the significance level is "\\alpha=0.05," and the degrees of freedom are "df_1=4" and "df_2=4," therefore, the rejection region for this F-test is "R=\\{F:F>F_c=2.39\\}."

Test Statistics

"F=\\dfrac{MS_{between}}{MS_{within}}=\\dfrac{19.163}{197.406}=0.097"

Since it is observed that "F=0.097<2.39=F_c," it is then concluded that the null hypothesis is not rejected. Therefore, there is not enough evidence to claim that not all 5 population means are equal, at the "\\alpha=0.05" significance level.

Using the P-value approach: The p-value is "p=0.9834," and since "p=0.9834\\geq0.05," it is concluded that the null hypothesis is not rejected. Therefore, there is not enough evidence to claim that not all 5 population means are equal, at the "\\alpha=0.05" significance level.