Question

The area of a square garden is 202 feet. Estimate the side length of the garden.

Answer 1

area of a square = side * side = side^2
now given that the area of the square garden is 202 sq. feet
means that
side^2 = 202 sq. feet
side = square root of 202 sq.feet
but mainly the area given should be square feet ( in units ) please note that as the area can not be in unit feet it should be in square feet

side = 14.2 feet ( approx.)

Answer 2

\[area= s^2\]
\[202=s^2\]
\[s=\sqrt{202}\]
\[s=14.21\]

Answer 3

if i did mistake then sorry

Answer 4

have u got the correct answer basket ball

Answer 5

mathpro has it

Answer 6

congrats satelite for becoming as a legend

Answer 7

thanks.. what anout this problem : -6m - 6 +8m = -5 +2m - 1. Tell whether the equation has infinitely many solutions or no solutions.

Answer 8

ok see here , -6m + 8m - 6 = -5 + 2m - 1
2m - 6 = - 5 -1 + 2m
2m - 6 = -6 + 2m
transpose 2m to LHS and -6 to RHS
2m - 2m = -6 + 6
0 = 0
infinite solutions

Answer 9

whats LHS & RHS

Answer 10

left hand side and right hand side

Answer 11

ok

Answer 12

The coordinates of three vertices of a rectangle are A(1,-5), B(1,3) and C(10,3). find the coordinates of the fourth vertex. then, find the arrea of the rectangle

Answer 13

it is left hand side and right hand side . ask any more problems

Answer 14

The coordinates of three vertices of a rectangle are A(1,-5), B(1,3) and C(10,3). find the coordinates of the fourth vertex. then, find the arrea of the rectangle

Answer 15

The coordinates of three vertices of a rectangle are A(1,-5), B(1,3) and C(10,3). find the coordinates of the fourth vertex. then, find the arrea of the rectangle

Answer 16

ok , let me answer u

Answer 17

k

Answer 18

see the other coordinate D would be ( 10, -5 ) since opposite sides of a rectangle are equal hence D = (10,-5 ) now the area of the rectangle would be
(AB) * ( BC ) since area of rectangle = length * breadth
now AB = 5 unit
and BC = 7 unit
hence the area = 7unit * 5 unit = 35 ( unit^2) hope u got it .

Answer 19

see the other coordinate D would be ( 10, -5 ) since opposite sides of a rectangle are equal hence D = (10,-5 ) now the area of the rectangle would be
(AB) * ( BC ) since area of rectangle = length * breadth
now AB = 5 unit
and BC = 7 unit
hence the area = 7unit * 5 unit = 35 ( unit^2) hope u got it .

Answer 20

see the other coordinate D would be ( 10, -5 ) since opposite sides of a rectangle are equal hence D = (10,-5 ) now the area of the rectangle would be
(AB) * ( BC ) since area of rectangle = length * breadth
now AB = 5 unit
and BC = 7 unit
hence the area = 7unit * 5 unit = 35 ( unit^2) hope u got it .

Answer 21

got it or not

Answer 22

isnt the area 72u^2

Answer 23

don't think so but may be . but according to me 35 u^2 is correct one

Answer 24

k

Answer 25

The formula for the resistance of a conductor with voltage V and current I is r= V/I. slove for V

Answer 26

would the answer be R.I=V......?

Answer 27

yes of course , i think so

Answer 28

k

Answer 29

any more questions

Answer 30

slove -0.25 + 1.75x < -1.75 + 2.25x

Answer 31

k so there is no equal sign

Answer 32

correct

Answer 33

is : 3 < x the answer?

Answer 34

.....?

Answer 35

let them be converted into fractions :
(-25/100 ) + (175/100)x < (-175/100) + (225/100)x
25(-5/100 + 7/100 x) < 25(-7/100 + 5/100)x
25(-5+7x)/100 < 25(-7+5x)/100
(-5+7x)/100 <( -7 + 5x)/100
-5+7x < -7 + 5x
2 < -2x
2/-2 < x
-1 < x
actually i don't know how to solve these type of problems but i found this

Answer 36

oh sorry u r correct

Answer 37

-0.25+1.75x<-1.75+2.25x

Since 2.25x contains the variable to solve for, move it to the left-hand side of the inequality by subtracting 2.25x from both sides.
1.75x-0.25-2.25x<-1.75

Since 1.75x and -2.25x are like terms, add -2.25x to 1.75x to get -0.5x.
-0.5x-0.25<-1.75

Since -0.25 does not contain the variable to solve for, move it to the right-hand side of the inequality by adding 0.25 to both sides.
-0.5x<0.25-1.75

Subtract 1.75 from 0.25 to get -1.5.
-0.5x<-1.5

Divide each term in the inequality by -0.5.
-(0.5x)/(-0.5)>-(1.5)/(-0.5)

Cancel the common factor of -0.5.
x>-(1.5)/(-0.5)

Simplify the right-hand side of the inequality by simplifying each term.
x>3

Answer 38

got it now

Answer 39

-0.25+1.75x<-1.75+2.25x

Since 2.25x contains the variable to solve for, move it to the left-hand side of the inequality by subtracting 2.25x from both sides.
1.75x-0.25-2.25x<-1.75

Since 1.75x and -2.25x are like terms, add -2.25x to 1.75x to get -0.5x.
-0.5x-0.25<-1.75

Since -0.25 does not contain the variable to solve for, move it to the right-hand side of the inequality by adding 0.25 to both sides.
-0.5x<0.25-1.75

Subtract 1.75 from 0.25 to get -1.5.
-0.5x<-1.5

Divide each term in the inequality by -0.5.
-(0.5x)/(-0.5)>-(1.5)/(-0.5)

Cancel the common factor of -0.5.
x>-(1.5)/(-0.5)

Simplify the right-hand side of the inequality by simplifying each term.
x>3

Answer 40

-0.25+1.75x<-1.75+2.25x

Since 2.25x contains the variable to solve for, move it to the left-hand side of the inequality by subtracting 2.25x from both sides.
1.75x-0.25-2.25x<-1.75

Since 1.75x and -2.25x are like terms, add -2.25x to 1.75x to get -0.5x.
-0.5x-0.25<-1.75

Since -0.25 does not contain the variable to solve for, move it to the right-hand side of the inequality by adding 0.25 to both sides.
-0.5x<0.25-1.75

Subtract 1.75 from 0.25 to get -1.5.
-0.5x<-1.5

Divide each term in the inequality by -0.5.
-(0.5x)/(-0.5)>-(1.5)/(-0.5)

Cancel the common factor of -0.5.
x>-(1.5)/(-0.5)

Simplify the right-hand side of the inequality by simplifying each term.
x>3

Answer 41

-0.25+1.75x<-1.75+2.25x

Since 2.25x contains the variable to solve for, move it to the left-hand side of the inequality by subtracting 2.25x from both sides.
1.75x-0.25-2.25x<-1.75

Since 1.75x and -2.25x are like terms, add -2.25x to 1.75x to get -0.5x.
-0.5x-0.25<-1.75

Since -0.25 does not contain the variable to solve for, move it to the right-hand side of the inequality by adding 0.25 to both sides.
-0.5x<0.25-1.75

Subtract 1.75 from 0.25 to get -1.5.
-0.5x<-1.5

Divide each term in the inequality by -0.5.
-(0.5x)/(-0.5)>-(1.5)/(-0.5)

Cancel the common factor of -0.5.
x>-(1.5)/(-0.5)

Simplify the right-hand side of the inequality by simplifying each term.
x>3

Answer 42

-0.25+1.75x<-1.75+2.25x

Since 2.25x contains the variable to solve for, move it to the left-hand side of the inequality by subtracting 2.25x from both sides.
1.75x-0.25-2.25x<-1.75

Since 1.75x and -2.25x are like terms, add -2.25x to 1.75x to get -0.5x.
-0.5x-0.25<-1.75

Since -0.25 does not contain the variable to solve for, move it to the right-hand side of the inequality by adding 0.25 to both sides.
-0.5x<0.25-1.75

Subtract 1.75 from 0.25 to get -1.5.
-0.5x<-1.5

Divide each term in the inequality by -0.5.
-(0.5x)/(-0.5)>-(1.5)/(-0.5)

Cancel the common factor of -0.5.
x>-(1.5)/(-0.5)

Simplify the right-hand side of the inequality by simplifying each term.
x>3

Answer 43

-0.25+1.75x<-1.75+2.25x

Since 2.25x contains the variable to solve for, move it to the left-hand side of the inequality by subtracting 2.25x from both sides.
1.75x-0.25-2.25x<-1.75

Since 1.75x and -2.25x are like terms, add -2.25x to 1.75x to get -0.5x.
-0.5x-0.25<-1.75

Since -0.25 does not contain the variable to solve for, move it to the right-hand side of the inequality by adding 0.25 to both sides.
-0.5x<0.25-1.75

Subtract 1.75 from 0.25 to get -1.5.
-0.5x<-1.5

Divide each term in the inequality by -0.5.
-(0.5x)/(-0.5)>-(1.5)/(-0.5)

Cancel the common factor of -0.5.
x>-(1.5)/(-0.5)

Simplify the right-hand side of the inequality by simplifying each term.
x>3