a) We can see from the table that with the increase in value of x , there is decrease in value of y , hence we can say that coefficient of correlation is negative b) Equation of least squares is y = − 3.8856 x + 9.3251 and correlation coefficient r = − 0.9996 Plot is c) Predicted value of y at x = 2.4 is 0.00034 Given information: Five points x 1 3 5 7 10 y −5.8 −2.4 −10.7 −17.8 −29.3 Formula used: Slope, m = ∑ i = 1 n ( x i − X ¯ ) ( y i − Y ¯ ) ∑ i = 1 n ( x i − X ¯ ) 2 Y axis intercept, b = Y ¯ − m X ¯ Correlation Coefficient, r = ∑ i = 1 n ( x i − X ¯ ) ( y i − Y ¯ ) ∑ i = 1 n ( x i − X ¯ ) 2 ∑ i = 1 n ( y i − Y ¯ ) 2 Where x i and y i are the i th entry of x and y ; X ¯ and Y ¯ are means of x and y Calculation: Step 1: Calculate the mean of x and y X ¯ = 1 + 3 + 5 + 7 + 10 5 = 5.2 Y ¯ = 5.8 + ( − 2.4 ) + ( − 10.7 ) + ( − 17.8 ) + ( − 29.3 ) 5 = − 10.88 Step 2: Plot the table as shown i x i y i x i − X ¯ y i − Y ¯ ( x i − X ¯ ) 2 ( x i − X ¯ ) ( y i − Y ¯ ) ( y i − Y ¯ ) 2 1 1 5.8 -4.2 16.68 17.64 -70.056 278.2224 2 3 -2.4 -2.2 8.48 4.84 -18.658 71.9104 3 5 -10.7 -0.2 0.18 0.04 -0.036 0.0324 4 7 -17.8 1.8 -6.92 3.24 -12.456 47.8864 5 10 -29.3 4.8 -18.42 23.04 -88.416 339.2964 ∑ i = 1 n ( x i − X ¯ ) 2 = 48.8 ∑ i = 1 n ( x i − X ¯ ) ( y i − Y ¯ ) = − 189.62 ∑ i = 1 n ( y i − Y ¯ ) 2 = 737.3480 Step 3: Calculate the slope m = ∑ i = 1 n ( x i − X ¯ ) ( y i − Y ¯ ) ∑ i = 1 n ( x i − X ¯ ) 2 = − 189.62 48.8 ≈ − 3.8856 Step 4: Calculate y intercept b = Y ¯ − m X ¯ = − 10.88 − ( − 3.8856 × 5.2 ) ≈ 9.3251 The slope of the line is − 3.8856 and y intercept is 9.3251 Using slope intercept form, y = m x + b ,equation is y = − 3.8856 x + 9.3251 Step 5: Draw the scatter plot Step 6: Calculate the Correlation coefficient r = ∑ i = 1 n ( x i − X ¯ ) ( y i − Y ¯ ) ∑ i = 1 n ( x i − X ¯ ) 2 ∑ i = 1 n ( y i − Y ¯ ) 2 = − 189.62 48.8 × 737.3480 ≈ − 0.9996 Step 7: Prediction for x = 2.4 ; plug x = 2.4 in y = − 3.8856 x + 9.3251 y = − 3.8856 ( 2.4 ) + 9.3251 = 0.00034

Question

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Answer 1

Question

Chapter 2.1, Problem 111E

To determine

To determine:

a) We can see from the table that with the increase in value of x , there is decrease in value of y , hence we can say that coefficient of correlation is negative

b) Equation of least squares is y=−3.8856x+9.3251 and correlation coefficient r=−0.9996

Plot is

c) Predicted value of y at x=2.4 is 0.00034

Given information: Five points

x 1 3 5 7 10

y −5.8 −2.4 −10.7 −17.8 −29.3

Formula used:Slope, m= ∑ i=1 n ( x i − X ¯ )( y i − Y ¯ ) ∑ i=1 n ( x i − X ¯ ) 2

Y axis intercept, b= Y ¯ −m X ¯

Correlation Coefficient, r= ∑ i=1 n ( x i − X ¯ )( y i − Y ¯ ) ∑ i=1 n ( x i − X ¯ ) 2 ∑ i=1 n ( y i − Y ¯ ) 2

Where x i and y i are the i th entry of x and y ; X ¯ and Y ¯ are means of x and y

Calculation:

Step 1: Calculate the mean of x and y
X ¯ = 1+3+5+7+10 5 =5.2 Y ¯ = 5.8+(−2.4)+(−10.7)+(−17.8)+(−29.3) 5 =−10.88
Step 2: Plot the table as shown

i x i y i x i − X ¯ y i − Y ¯ ( x i − X ¯ ) 2 ( x i − X ¯ )( y i − Y ¯ ) ( y i − Y ¯ ) 2

1 1 5.8 -4.2 16.68 17.64 -70.056 278.2224

2 3 -2.4 -2.2 8.48 4.84 -18.658 71.9104

3 5 -10.7 -0.2 0.18 0.04 -0.036 0.0324

4 7 -17.8 1.8 -6.92 3.24 -12.456 47.8864

5 10 -29.3 4.8 -18.42 23.04 -88.416 339.2964

∑ i=1 n ( x i − X ¯ ) 2 =48.8 ∑ i=1 n ( x i − X ¯ )( y i − Y ¯ ) =−189.62 ∑ i=1 n ( y i − Y ¯ ) 2 =737.3480

Step 3: Calculate the slope m= ∑ i=1 n ( x i − X ¯ )( y i − Y ¯ ) ∑ i=1 n ( x i − X ¯ ) 2 = −189.62 48.8 ≈−3.8856

Step 4: Calculate y intercept b= Y ¯ −m X ¯ =−10.88−(−3.8856×5.2)≈9.3251

The slope of the line is −3.8856 and y intercept is 9.3251

Using slope intercept form, y=mx+b ,equation is y=−3.8856x+9.3251

Step 5: Draw the scatter plot

Step 6: Calculate the Correlation coefficient
r= ∑ i=1 n ( x i − X ¯ )( y i − Y ¯ ) ∑ i=1 n ( x i − X ¯ ) 2 ∑ i=1 n ( y i − Y ¯ ) 2 = −189.62 48.8 × 737.3480 ≈−0.9996
Step 7: Prediction for x=2.4 ; plug x=2.4 in y=−3.8856x+9.3251
y=−3.8856(2.4)+9.3251=0.00034

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Directions: Use the equation A = Pet to answer each question and be sure to show all your work. 1. If $5,000 is deposited in an account that receives 6.1% interest compounded continuously, how much money is in the account after 6 years? 2. After how many years will an account have $12,000 if $6,000 is deposited, and the account receives 3.8% interest compounded continuously? 3. Abigail wants to save $15,000 to buy a car in 7 years. If she deposits $10,000 into an account that receives 5.7% interest compounded continuously, will she have enough money in 7 years? 4. Daniel deposits $8,000 into a continuously compounding interest account. After 18 years, there is $13,006.40 in the account. What was the interest rate? 5. An account has $26,000 after 15 years. The account received 2.3% interest compounded continuously. How much was deposited initially?

TRIANGLES INDEPENDENT PRACTICE ription Criangle write and cow Using each picture or description of triangle write and solve an equation in ordering the number of degrees in each angle TRIANGLE EQUATION & WORK ANGLE MEASURES A B -(7x-2)° (4x) (3x)° (5x − 10) C (5x – 2) (18x) E 3. G 4. H (16x)° LL 2A= 2B= ZE=

Answer ASAP and every part, please. Structures.

Answer 2

Question

Chapter 2.1, Problem 111E

To determine

To determine:

a) We can see from the table that with the increase in value of x , there is decrease in value of y , hence we can say that coefficient of correlation is negative

b) Equation of least squares is y=−3.8856x+9.3251 and correlation coefficient r=−0.9996

Plot is

c) Predicted value of y at x=2.4 is 0.00034

Given information: Five points

x 1 3 5 7 10

y −5.8 −2.4 −10.7 −17.8 −29.3

Formula used:Slope, m= ∑ i=1 n ( x i − X ¯ )( y i − Y ¯ ) ∑ i=1 n ( x i − X ¯ ) 2

Y axis intercept, b= Y ¯ −m X ¯

Correlation Coefficient, r= ∑ i=1 n ( x i − X ¯ )( y i − Y ¯ ) ∑ i=1 n ( x i − X ¯ ) 2 ∑ i=1 n ( y i − Y ¯ ) 2

Where x i and y i are the i th entry of x and y ; X ¯ and Y ¯ are means of x and y

Calculation:

Step 1: Calculate the mean of x and y
X ¯ = 1+3+5+7+10 5 =5.2 Y ¯ = 5.8+(−2.4)+(−10.7)+(−17.8)+(−29.3) 5 =−10.88
Step 2: Plot the table as shown

i x i y i x i − X ¯ y i − Y ¯ ( x i − X ¯ ) 2 ( x i − X ¯ )( y i − Y ¯ ) ( y i − Y ¯ ) 2

1 1 5.8 -4.2 16.68 17.64 -70.056 278.2224

2 3 -2.4 -2.2 8.48 4.84 -18.658 71.9104

3 5 -10.7 -0.2 0.18 0.04 -0.036 0.0324

4 7 -17.8 1.8 -6.92 3.24 -12.456 47.8864

5 10 -29.3 4.8 -18.42 23.04 -88.416 339.2964

∑ i=1 n ( x i − X ¯ ) 2 =48.8 ∑ i=1 n ( x i − X ¯ )( y i − Y ¯ ) =−189.62 ∑ i=1 n ( y i − Y ¯ ) 2 =737.3480

Step 3: Calculate the slope m= ∑ i=1 n ( x i − X ¯ )( y i − Y ¯ ) ∑ i=1 n ( x i − X ¯ ) 2 = −189.62 48.8 ≈−3.8856

Step 4: Calculate y intercept b= Y ¯ −m X ¯ =−10.88−(−3.8856×5.2)≈9.3251

The slope of the line is −3.8856 and y intercept is 9.3251

Using slope intercept form, y=mx+b ,equation is y=−3.8856x+9.3251

Step 5: Draw the scatter plot

Step 6: Calculate the Correlation coefficient
r= ∑ i=1 n ( x i − X ¯ )( y i − Y ¯ ) ∑ i=1 n ( x i − X ¯ ) 2 ∑ i=1 n ( y i − Y ¯ ) 2 = −189.62 48.8 × 737.3480 ≈−0.9996
Step 7: Prediction for x=2.4 ; plug x=2.4 in y=−3.8856x+9.3251
y=−3.8856(2.4)+9.3251=0.00034

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Answer 3

Question

Chapter 2.1, Problem 111E

To determine

To determine:

a) We can see from the table that with the increase in value of x , there is decrease in value of y , hence we can say that coefficient of correlation is negative

b) Equation of least squares is y=−3.8856x+9.3251 and correlation coefficient r=−0.9996

Plot is

c) Predicted value of y at x=2.4 is 0.00034

Given information: Five points

x 1 3 5 7 10

y −5.8 −2.4 −10.7 −17.8 −29.3

Formula used:Slope, m= ∑ i=1 n ( x i − X ¯ )( y i − Y ¯ ) ∑ i=1 n ( x i − X ¯ ) 2

Y axis intercept, b= Y ¯ −m X ¯

Correlation Coefficient, r= ∑ i=1 n ( x i − X ¯ )( y i − Y ¯ ) ∑ i=1 n ( x i − X ¯ ) 2 ∑ i=1 n ( y i − Y ¯ ) 2

Where x i and y i are the i th entry of x and y ; X ¯ and Y ¯ are means of x and y

Calculation:

Step 1: Calculate the mean of x and y
X ¯ = 1+3+5+7+10 5 =5.2 Y ¯ = 5.8+(−2.4)+(−10.7)+(−17.8)+(−29.3) 5 =−10.88
Step 2: Plot the table as shown

i x i y i x i − X ¯ y i − Y ¯ ( x i − X ¯ ) 2 ( x i − X ¯ )( y i − Y ¯ ) ( y i − Y ¯ ) 2

1 1 5.8 -4.2 16.68 17.64 -70.056 278.2224

2 3 -2.4 -2.2 8.48 4.84 -18.658 71.9104

3 5 -10.7 -0.2 0.18 0.04 -0.036 0.0324

4 7 -17.8 1.8 -6.92 3.24 -12.456 47.8864

5 10 -29.3 4.8 -18.42 23.04 -88.416 339.2964

∑ i=1 n ( x i − X ¯ ) 2 =48.8 ∑ i=1 n ( x i − X ¯ )( y i − Y ¯ ) =−189.62 ∑ i=1 n ( y i − Y ¯ ) 2 =737.3480

Step 3: Calculate the slope m= ∑ i=1 n ( x i − X ¯ )( y i − Y ¯ ) ∑ i=1 n ( x i − X ¯ ) 2 = −189.62 48.8 ≈−3.8856

Step 4: Calculate y intercept b= Y ¯ −m X ¯ =−10.88−(−3.8856×5.2)≈9.3251

The slope of the line is −3.8856 and y intercept is 9.3251

Using slope intercept form, y=mx+b ,equation is y=−3.8856x+9.3251

Step 5: Draw the scatter plot

Step 6: Calculate the Correlation coefficient
r= ∑ i=1 n ( x i − X ¯ )( y i − Y ¯ ) ∑ i=1 n ( x i − X ¯ ) 2 ∑ i=1 n ( y i − Y ¯ ) 2 = −189.62 48.8 × 737.3480 ≈−0.9996
Step 7: Prediction for x=2.4 ; plug x=2.4 in y=−3.8856x+9.3251
y=−3.8856(2.4)+9.3251=0.00034

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See solution

Answer 4

Question

Chapter 2.1, Problem 111E

To determine

To determine:

a) We can see from the table that with the increase in value of x , there is decrease in value of y , hence we can say that coefficient of correlation is negative

b) Equation of least squares is y=−3.8856x+9.3251 and correlation coefficient r=−0.9996

Plot is

c) Predicted value of y at x=2.4 is 0.00034

Given information: Five points

x 1 3 5 7 10

y −5.8 −2.4 −10.7 −17.8 −29.3

Formula used:Slope, m= ∑ i=1 n ( x i − X ¯ )( y i − Y ¯ ) ∑ i=1 n ( x i − X ¯ ) 2

Y axis intercept, b= Y ¯ −m X ¯

Correlation Coefficient, r= ∑ i=1 n ( x i − X ¯ )( y i − Y ¯ ) ∑ i=1 n ( x i − X ¯ ) 2 ∑ i=1 n ( y i − Y ¯ ) 2

Where x i and y i are the i th entry of x and y ; X ¯ and Y ¯ are means of x and y

Calculation:

Step 1: Calculate the mean of x and y
X ¯ = 1+3+5+7+10 5 =5.2 Y ¯ = 5.8+(−2.4)+(−10.7)+(−17.8)+(−29.3) 5 =−10.88
Step 2: Plot the table as shown

i x i y i x i − X ¯ y i − Y ¯ ( x i − X ¯ ) 2 ( x i − X ¯ )( y i − Y ¯ ) ( y i − Y ¯ ) 2

1 1 5.8 -4.2 16.68 17.64 -70.056 278.2224

2 3 -2.4 -2.2 8.48 4.84 -18.658 71.9104

3 5 -10.7 -0.2 0.18 0.04 -0.036 0.0324

4 7 -17.8 1.8 -6.92 3.24 -12.456 47.8864

5 10 -29.3 4.8 -18.42 23.04 -88.416 339.2964

∑ i=1 n ( x i − X ¯ ) 2 =48.8 ∑ i=1 n ( x i − X ¯ )( y i − Y ¯ ) =−189.62 ∑ i=1 n ( y i − Y ¯ ) 2 =737.3480

Step 3: Calculate the slope m= ∑ i=1 n ( x i − X ¯ )( y i − Y ¯ ) ∑ i=1 n ( x i − X ¯ ) 2 = −189.62 48.8 ≈−3.8856

Step 4: Calculate y intercept b= Y ¯ −m X ¯ =−10.88−(−3.8856×5.2)≈9.3251

The slope of the line is −3.8856 and y intercept is 9.3251

Using slope intercept form, y=mx+b ,equation is y=−3.8856x+9.3251

Step 5: Draw the scatter plot

Step 6: Calculate the Correlation coefficient
r= ∑ i=1 n ( x i − X ¯ )( y i − Y ¯ ) ∑ i=1 n ( x i − X ¯ ) 2 ∑ i=1 n ( y i − Y ¯ ) 2 = −189.62 48.8 × 737.3480 ≈−0.9996
Step 7: Prediction for x=2.4 ; plug x=2.4 in y=−3.8856x+9.3251
y=−3.8856(2.4)+9.3251=0.00034

Expert Solution & Answer

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See solution

Answer 5

Chapter 2.1, Problem 111E

To determine

To determine:

a) We can see from the table that with the increase in value of x , there is decrease in value of y , hence we can say that coefficient of correlation is negative

b) Equation of least squares is y=−3.8856x+9.3251 and correlation coefficient r=−0.9996

Plot is

c) Predicted value of y at x=2.4 is 0.00034

Given information: Five points

x 1 3 5 7 10

y −5.8 −2.4 −10.7 −17.8 −29.3

Formula used:Slope, m= ∑ i=1 n ( x i − X ¯ )( y i − Y ¯ ) ∑ i=1 n ( x i − X ¯ ) 2

Y axis intercept, b= Y ¯ −m X ¯

Correlation Coefficient, r= ∑ i=1 n ( x i − X ¯ )( y i − Y ¯ ) ∑ i=1 n ( x i − X ¯ ) 2 ∑ i=1 n ( y i − Y ¯ ) 2

Where x i and y i are the i th entry of x and y ; X ¯ and Y ¯ are means of x and y

Calculation:

Step 1: Calculate the mean of x and y
X ¯ = 1+3+5+7+10 5 =5.2 Y ¯ = 5.8+(−2.4)+(−10.7)+(−17.8)+(−29.3) 5 =−10.88
Step 2: Plot the table as shown

i x i y i x i − X ¯ y i − Y ¯ ( x i − X ¯ ) 2 ( x i − X ¯ )( y i − Y ¯ ) ( y i − Y ¯ ) 2

1 1 5.8 -4.2 16.68 17.64 -70.056 278.2224

2 3 -2.4 -2.2 8.48 4.84 -18.658 71.9104

3 5 -10.7 -0.2 0.18 0.04 -0.036 0.0324

4 7 -17.8 1.8 -6.92 3.24 -12.456 47.8864

5 10 -29.3 4.8 -18.42 23.04 -88.416 339.2964

∑ i=1 n ( x i − X ¯ ) 2 =48.8 ∑ i=1 n ( x i − X ¯ )( y i − Y ¯ ) =−189.62 ∑ i=1 n ( y i − Y ¯ ) 2 =737.3480

Step 3: Calculate the slope m= ∑ i=1 n ( x i − X ¯ )( y i − Y ¯ ) ∑ i=1 n ( x i − X ¯ ) 2 = −189.62 48.8 ≈−3.8856

Step 4: Calculate y intercept b= Y ¯ −m X ¯ =−10.88−(−3.8856×5.2)≈9.3251

The slope of the line is −3.8856 and y intercept is 9.3251

Using slope intercept form, y=mx+b ,equation is y=−3.8856x+9.3251

Step 5: Draw the scatter plot

Step 6: Calculate the Correlation coefficient
r= ∑ i=1 n ( x i − X ¯ )( y i − Y ¯ ) ∑ i=1 n ( x i − X ¯ ) 2 ∑ i=1 n ( y i − Y ¯ ) 2 = −189.62 48.8 × 737.3480 ≈−0.9996
Step 7: Prediction for x=2.4 ; plug x=2.4 in y=−3.8856x+9.3251
y=−3.8856(2.4)+9.3251=0.00034

Answer 6

Chapter 2.1, Problem 111E

To determine

To determine:

a) We can see from the table that with the increase in value of x , there is decrease in value of y , hence we can say that coefficient of correlation is negative

b) Equation of least squares is y=−3.8856x+9.3251 and correlation coefficient r=−0.9996

Plot is

c) Predicted value of y at x=2.4 is 0.00034

Given information: Five points

x 1 3 5 7 10

y −5.8 −2.4 −10.7 −17.8 −29.3

Formula used:Slope, m= ∑ i=1 n ( x i − X ¯ )( y i − Y ¯ ) ∑ i=1 n ( x i − X ¯ ) 2

Y axis intercept, b= Y ¯ −m X ¯

Correlation Coefficient, r= ∑ i=1 n ( x i − X ¯ )( y i − Y ¯ ) ∑ i=1 n ( x i − X ¯ ) 2 ∑ i=1 n ( y i − Y ¯ ) 2

Where x i and y i are the i th entry of x and y ; X ¯ and Y ¯ are means of x and y

Calculation:

Step 1: Calculate the mean of x and y
X ¯ = 1+3+5+7+10 5 =5.2 Y ¯ = 5.8+(−2.4)+(−10.7)+(−17.8)+(−29.3) 5 =−10.88
Step 2: Plot the table as shown

i x i y i x i − X ¯ y i − Y ¯ ( x i − X ¯ ) 2 ( x i − X ¯ )( y i − Y ¯ ) ( y i − Y ¯ ) 2

1 1 5.8 -4.2 16.68 17.64 -70.056 278.2224

2 3 -2.4 -2.2 8.48 4.84 -18.658 71.9104

3 5 -10.7 -0.2 0.18 0.04 -0.036 0.0324

4 7 -17.8 1.8 -6.92 3.24 -12.456 47.8864

5 10 -29.3 4.8 -18.42 23.04 -88.416 339.2964

∑ i=1 n ( x i − X ¯ ) 2 =48.8 ∑ i=1 n ( x i − X ¯ )( y i − Y ¯ ) =−189.62 ∑ i=1 n ( y i − Y ¯ ) 2 =737.3480

Step 3: Calculate the slope m= ∑ i=1 n ( x i − X ¯ )( y i − Y ¯ ) ∑ i=1 n ( x i − X ¯ ) 2 = −189.62 48.8 ≈−3.8856

Step 4: Calculate y intercept b= Y ¯ −m X ¯ =−10.88−(−3.8856×5.2)≈9.3251

The slope of the line is −3.8856 and y intercept is 9.3251

Using slope intercept form, y=mx+b ,equation is y=−3.8856x+9.3251

Step 5: Draw the scatter plot

Step 6: Calculate the Correlation coefficient
r= ∑ i=1 n ( x i − X ¯ )( y i − Y ¯ ) ∑ i=1 n ( x i − X ¯ ) 2 ∑ i=1 n ( y i − Y ¯ ) 2 = −189.62 48.8 × 737.3480 ≈−0.9996
Step 7: Prediction for x=2.4 ; plug x=2.4 in y=−3.8856x+9.3251
y=−3.8856(2.4)+9.3251=0.00034

Answer 7

Chapter 2.1, Problem 111E

To determine

To determine:

a) We can see from the table that with the increase in value of x , there is decrease in value of y , hence we can say that coefficient of correlation is negative

b) Equation of least squares is y=−3.8856x+9.3251 and correlation coefficient r=−0.9996

Plot is

c) Predicted value of y at x=2.4 is 0.00034

Given information: Five points

x 1 3 5 7 10

y −5.8 −2.4 −10.7 −17.8 −29.3

Formula used:Slope, m= ∑ i=1 n ( x i − X ¯ )( y i − Y ¯ ) ∑ i=1 n ( x i − X ¯ ) 2

Y axis intercept, b= Y ¯ −m X ¯

Correlation Coefficient, r= ∑ i=1 n ( x i − X ¯ )( y i − Y ¯ ) ∑ i=1 n ( x i − X ¯ ) 2 ∑ i=1 n ( y i − Y ¯ ) 2

Where x i and y i are the i th entry of x and y ; X ¯ and Y ¯ are means of x and y

Calculation:

Step 1: Calculate the mean of x and y
X ¯ = 1+3+5+7+10 5 =5.2 Y ¯ = 5.8+(−2.4)+(−10.7)+(−17.8)+(−29.3) 5 =−10.88
Step 2: Plot the table as shown

i x i y i x i − X ¯ y i − Y ¯ ( x i − X ¯ ) 2 ( x i − X ¯ )( y i − Y ¯ ) ( y i − Y ¯ ) 2

1 1 5.8 -4.2 16.68 17.64 -70.056 278.2224

2 3 -2.4 -2.2 8.48 4.84 -18.658 71.9104

3 5 -10.7 -0.2 0.18 0.04 -0.036 0.0324

4 7 -17.8 1.8 -6.92 3.24 -12.456 47.8864

5 10 -29.3 4.8 -18.42 23.04 -88.416 339.2964

∑ i=1 n ( x i − X ¯ ) 2 =48.8 ∑ i=1 n ( x i − X ¯ )( y i − Y ¯ ) =−189.62 ∑ i=1 n ( y i − Y ¯ ) 2 =737.3480

Step 3: Calculate the slope m= ∑ i=1 n ( x i − X ¯ )( y i − Y ¯ ) ∑ i=1 n ( x i − X ¯ ) 2 = −189.62 48.8 ≈−3.8856

Step 4: Calculate y intercept b= Y ¯ −m X ¯ =−10.88−(−3.8856×5.2)≈9.3251

The slope of the line is −3.8856 and y intercept is 9.3251

Using slope intercept form, y=mx+b ,equation is y=−3.8856x+9.3251

Step 5: Draw the scatter plot

Step 6: Calculate the Correlation coefficient
r= ∑ i=1 n ( x i − X ¯ )( y i − Y ¯ ) ∑ i=1 n ( x i − X ¯ ) 2 ∑ i=1 n ( y i − Y ¯ ) 2 = −189.62 48.8 × 737.3480 ≈−0.9996
Step 7: Prediction for x=2.4 ; plug x=2.4 in y=−3.8856x+9.3251
y=−3.8856(2.4)+9.3251=0.00034

Answer 8

Expert Solution & Answer

Answer 9

Expert Solution & Answer

Answer 10

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Answer 11

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Chapter 2 Solutions

i	x i	y i	x i − X ¯	y i − Y ¯	( x i − X ¯ ) 2	( x i − X ¯ )( y i − Y ¯ )	( y i − Y ¯ ) 2
1	1	5.8	-4.2	16.68	17.64	-70.056	278.2224
2	3	-2.4	-2.2	8.48	4.84	-18.658	71.9104
3	5	-10.7	-0.2	0.18	0.04	-0.036	0.0324
4	7	-17.8	1.8	-6.92	3.24	-12.456	47.8864
5	10	-29.3	4.8	-18.42	23.04	-88.416	339.2964
					∑ i=1 n ( x i − X ¯ ) 2 =48.8	∑ i=1 n ( x i − X ¯ )( y i − Y ¯ ) =−189.62	∑ i=1 n ( y i − Y ¯ ) 2 =737.3480