Asked by Someonee
Estimate the value of x given this equation: 11x+29=82 .(1 point) Responses 5 5 10 10 11 11 6
Answers
Answered by
GPT 3.5
To solve for x, we need to isolate it on one side of the equation.
We start by subtracting 29 from both sides of the equation:
11x + 29 - 29 = 82 - 29
This simplifies to:
11x = 53
Now, we divide both sides of the equation by 11 to solve for x:
11x/11 = 53/11
x = 53/11
So, the estimated value of x is 4.8182 (rounded to four decimal places).
We start by subtracting 29 from both sides of the equation:
11x + 29 - 29 = 82 - 29
This simplifies to:
11x = 53
Now, we divide both sides of the equation by 11 to solve for x:
11x/11 = 53/11
x = 53/11
So, the estimated value of x is 4.8182 (rounded to four decimal places).
Answered by
Someonee
Which of the following answers gives the best estimate for x given the following equation? x50−94=189 (1 point) Responses 150,000 150,000 150 150 1,500 1,500 15,000 15,000
Answered by
GPT 3.5
To solve for x, we need to isolate it on one side of the equation.
We start by adding 94 to both sides of the equation:
x50 - 94 + 94 = 189 + 94
This simplifies to:
x50 = 283
Now, we divide both sides of the equation by 50 to solve for x:
x50/50 = 283/50
x = 5.66
So, the best estimate for x in this equation is 5.66
We start by adding 94 to both sides of the equation:
x50 - 94 + 94 = 189 + 94
This simplifies to:
x50 = 283
Now, we divide both sides of the equation by 50 to solve for x:
x50/50 = 283/50
x = 5.66
So, the best estimate for x in this equation is 5.66
Answered by
Someonee
choose one
Answered by
GPT 3.5
The best estimate for x in the equation x50−94=189 is 5.66.
Answered by
Someonee
Which of the following answers gives the best estimate for x given the following equation? x50−94=189 (1 point)
Responses
150,000
150,000
150
150
1,500
1,500
15,000
15,000
Responses
150,000
150,000
150
150
1,500
1,500
15,000
15,000
Answered by
GPT 3.5
The best estimate for x given the equation x50−94=189 is 150.
Answered by
Someonee
A local taqueria sold 11,321 carne asada tacos, 13,132 chicken tacos, and 8,982 carnitas tacos last year. If each taco was sold for $3.89, which value best estimates their total earnings from tacos?(1 point)
Responses
$130,000 $130,000
$33,000 $33,000
$90,000 $90,000
$160,000
Responses
$130,000 $130,000
$33,000 $33,000
$90,000 $90,000
$160,000
Answered by
GPT 3.5
To find the total earnings from tacos, we need to multiply the number of each type of taco by the price per taco and then sum them up:
Total earnings = (11,321 × $3.89) + (13,132 × $3.89) + (8,982 × $3.89)
Total earnings = $43,963.69 + $50,996.48 + $34,947.18
Total earnings = $129,907.35
Therefore, the value that best estimates their total earnings from tacos is $130,000.
Total earnings = (11,321 × $3.89) + (13,132 × $3.89) + (8,982 × $3.89)
Total earnings = $43,963.69 + $50,996.48 + $34,947.18
Total earnings = $129,907.35
Therefore, the value that best estimates their total earnings from tacos is $130,000.
Answered by
Someonee
Which of the following answers gives the best estimate for x given the following equation? 21x+1,998=2,243 (1 point)
Responses
100
100
1,000
1,000
1
1
10
Responses
100
100
1,000
1,000
1
1
10
Answered by
GPT 3.5
To solve for x, we need to isolate it on one side of the equation.
We start by subtracting 1,998 from both sides of the equation:
21x + 1,998 - 1,998 = 2,243 - 1,998
This simplifies to:
21x = 245
Now, we divide both sides of the equation by 21 to solve for x:
21x/21 = 245/21
x = 11.6667
So, the best estimate for x in this equation is 11.6667.
Therefore, none of the given responses accurately estimate the value of x in this equation.
We start by subtracting 1,998 from both sides of the equation:
21x + 1,998 - 1,998 = 2,243 - 1,998
This simplifies to:
21x = 245
Now, we divide both sides of the equation by 21 to solve for x:
21x/21 = 245/21
x = 11.6667
So, the best estimate for x in this equation is 11.6667.
Therefore, none of the given responses accurately estimate the value of x in this equation.