Answer:
Explanation:
To determine the regression line for the given points, we need to calculate the slope (m) and the y-intercept (b) of the line. We can use the formula for the slope of a line:
m = (nΣxy - ΣxΣy) / (nΣx^2 - (Σx)^2)
where n is the number of data points, Σxy is the sum of the product of x and y, Σx is the sum of x, Σy is the sum of y, and Σx^2 is the sum of the squares of x.
Using the given points, we can calculate:
n = 5
Σx = 18
Σy = 3
Σxy = 17
Σx^2 = 86
Plugging these values into the formula, we get:
m = (5 * 17 - 18 * 3) / (5 * 86 - 18^2) = 0.235
To find the y-intercept (b), we can use the formula:
b = 1/n * Σy - m/n * Σx
Plugging in the values, we get:
b = 1/5 * 3 - 0.235/5 * 18 = -0.294
Therefore, the regression line is:
y = 0.235x - 0.294
To find the predicted value for x = 3, we can plug in x = 3 into the equation:
y = 0.235(3) - 0.294 = -0.088
Therefore, the predicted value for x = 3 is -0.088.
To determine whether there is a good correlation between the two variables, we can calculate the correlation coefficient (r). The correlation coefficient measures the strength and direction of the linear relationship between two variables. A value of r between -1 and 1 indicates the strength and direction of the correlation, with 0 indicating no correlation and -1 or 1 indicating a perfect negative or positive correlation, respectively.
Using the given points, we can calculate:
r = [nΣxy - ΣxΣy] / sqrt[(nΣx^2 - (Σx)^2)(nΣy^2 - (Σy)^2)]
Plugging in the values, we get:
r = [5 * 17 - 18 * 3] / sqrt[(5 * 86 - 18^2)(5 * 14 - 3^2)] = 0.876
Since the correlation coefficient is close to 1, there is a strong positive correlation between the two variables. Therefore, we can conclude that there is a good correlation between the two variables.