The least squares line of best fit for a data set with a positive correlation coefficient always has a: A. positive slope. B. positive x-intercept. C. positive y-intercept. D. B…

Question

asked May 9, 2020 191k views

1 Answer

Rune Jensen · Answer 1 · 2020-05-16T02:12:47+0000

Answer:

A. positive slope.

Explanation:

In the least square linear regression of Y on X, the straight line of best fit is given by,

$Y_(s) = \mu_(Y) + \rho * \frac {\sigma_(Y)}{\sigma_(X)} * (X - \mu_(X))$ ------------------(1)

[where
Y_(s) is the estimated value of Y]

Clearly, here,

Slope pf the line =
$\rho * \frac {\sigma_(Y)}{\sigma_(X)}$ ---------------------------------(2)

Y- intercept =
$\mu_(Y) - \rho * \mu_(X) * \frac {\sigma_(Y)}{\sigma_(X)}$ -----------------(3)

and,

X - intercept =
$\mu_(X) - \mu_(Y) * \frac {\sigma_(X)}{\rho * \sigma_(Y)}$ ----------------(4) [putting
Y_(s) = 0 in (1) and taking the value of X]

So,

since
$\sigma_(Y), \sigma_(X) > 0$

[since
$\sigma_(Y) = 0$ or
$\sigma_(X) = 0$ will result in a degenerate distribution, hence these cases are discarded]

so, correlation coefficient =
$\rho$ > 0 implies

A. positive slope. [as evident from (1)]

clearly from (3) and (4) all the other options are false.