From the following data estimate y when x = 125. X 120 115 120 125 126 123 Y 13 15 14 13 12 14 - Mathematics and Statistics

प्रश्न

From the following data estimate y when x = 125.

X	120	115	120	125	126	123
Y	13	15	14	13	12	14

योग

उत्तर

In order to estimate y, we have to find the regression equation of Y on X.

X = x_i	Y = y_i	`"x"_"i"^2`	x_i y_i
120	13	14400	1560
115	15	13225	1725
120	14	14400	1680
125	13	15625	1625
126	12	15876	1512
123	14	15129	1722
729	81	88655	9824

From table, we get

n = 6, ∑ x_i= 729, ∑ y_i= 81, ∑ `"x"_"i"^2` = 88655, ∑ x_i y_i= 9824

∴ `bar"x" = (sum "x"_"i")/"n" = 729/6 = 121.5`

∴ `bar"y" = (sum "y"_"i")/"n" = 81/6 = 13.5`

Now,

`"b"_"YX" = (sum"x"_"i" "y"_"i" - "n" bar "x" bar "y")/(sum "x"_"i"^2 - "n" bar"x"^2)`

`= (9824 - 6 xx 121.5 xx 13.5)/(88655 - 6(121.5)^2)`

`= (9824 - 9841.5)/(88655 - 88573.5)`

= `(- 17.5)/81.5`

= - 0.22

Also, `"a" = bar"y" - "b"_"YX" bar"x"`

= 13.5 - (- 0.22) × 121.5

= 13.5 + 26.73

= 40.23

∴ The regression equation of Y on X is

Y = a + b_YX X

∴ Y = 40.23 - 0.22 X

For X = 125,

Y = 40.23 - 0.22 × 125 = 40.23 - 27.5 = 12.73

∴ The estimated value of Y is 12.73 for X = 125.

shaalaa.com

Types of Linear Regression

क्या इस प्रश्न या उत्तर में कोई त्रुटि है?

Q 4 Q 3 Q 5.1

अध्याय 3: Linear Regression - Exercise 3.1 [पृष्ठ ४१]

APPEARS IN

बालभारती Mathematics and Statistics 2 (Commerce) [English] Standard 12 Maharashtra State Board

अध्याय 3 Linear Regression
Exercise 3.1 | Q 4 | पृष्ठ ४१

संबंधित प्रश्न

Calculate the regression equations of X on Y and Y on X from the following data:

X	10	12	13	17	18
Y	5	6	7	9	13

The following table gives the aptitude test scores and productivity indices of 10 workers selected at random.

Aptitude score (X)	60	62	65	70	72	48	53	73	65	82
Productivity Index (Y)	68	60	62	80	85	40	52	62	60	81

Obtain the two regression equations and estimate the productivity index of a worker whose test score is 95.

The following table gives the aptitude test scores and productivity indices of 10 workers selected at random.

Aptitude score (X)	60	62	65	70	72	48	53	73	65	82
Productivity Index (Y)	68	60	62	80	85	40	52	62	60	81

Obtain the two regression equations and estimate the test score when the productivity index is 75.

From the following data obtain the equation of two regression lines:

X	6	2	10	4	8
Y	9	11	5	8	7

For the following data, find the regression line of Y on X

X	1	2	3
Y	2	1	6

Hence find the most likely value of y when x = 4.

From the following data, find the regression equation of Y on X and estimate Y when X = 10.

X	1	2	3	4	5	6
Y	2	4	7	6	5	6

The following sample gives the number of hours of study (X) per day for an examination and marks (Y) obtained by 12 students.

X	3	3	3	4	4	5	5	5	6	6	7	8
Y	45	60	55	60	75	70	80	75	90	80	75	85

Obtain the line of regression of marks on hours of study.

Choose the correct alternative.

If u = `("x - a")/"c" and "v" = ("y - b")/"d" "then" "b"_"yx"` = _________

Choose the correct alternative.

If u = `("x - a")/"c" and "v" = ("y - b")/"d" "then" "b"_"xy"` = _________

Choose the correct alternative.

Corr (x, x) = _____

The regression equation of y on x is given by 3x + 2y − 26 = 0. Find b_yx.

Choose the correct alternative.

Cov (x, y) = __________

Fill in the blank:

Regression equation of Y on X is_________

Fill in the blank:

There are __________ types of regression equations.

Fill in the blank:

Corr (x, −x) = __________

Fill in the blank:

If u = `"x - a"/"c" and "v" = "y - b"/"d"` then b_xy = _______

Fill in the blank:

If u = `"x - a"/"c" and "v" = "y - b"/"d"` then b_yx = _______

Fill in the blank:

b_xy . b_yx = _______

Regression equation of X on Y is `("y" - bar "y") = "b"_"yx" ("x" - bar "x")`