Using a number line, what is the approximate value of 19−−√?(1 point)
Man I miss those times when they used to tell us the whole answers...
Using a number line, what is the approximate number value of 103−−−√? Provide your answer in decimal form, rounded to the nearest hundredth.(1 point)
03−−−√ is approximately
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Ratty fatty...you are just stupid lmao
1. This was a math question, and you are so desperate you have to clog it up with questions not even related to math.
2. How do you not know expanded form that was taught in like 2nd grade 💀💀💀
bot? Using a number line, what whole number and rational number to the nearest half is 105−−−√ between?(1 point)
To determine which whole number and rational number to the nearest half is between 105−−−√, we can use a number line approach.
Start by finding the whole number closest to the square root of 105.
On the number line, the square root of 100 is 10, and the square root of 121 is 11. Since 105 is between 100 and 121, we know that the square root of 105 must be between 10 and 11.
Next, find the rational number to the nearest half that is between these two whole numbers.
Based on our understanding of square roots, the square root of 105 is closer to 10 than to 11.
To find the number to the nearest half, we can use the average of 10 and 11, which is 10.5.
Therefore, the whole number to the nearest half that 105−−−√ is between is 10, and the rational number to the nearest half is 10.5.
Using rational approximations, what statement is true?(1 point)
Responses
49−−√>7
start root 49 end root greater than 7
48−−√<36−−√
start root 48 end root less than start root 36 end root
49−−√<7
start root 49 end root less than 7
48−−√>36−−√
To compare the values 49−−√ and 7, we can use rational approximations.
The square root of 49 is 7, which means that 49−−√ is equal to 7.
7 is equal to 7, so 49−−√ is not greater than 7. Thus, the statement "49−−√>7" is not true.
To compare the values 48−−√ and 36−−√, we can again use rational approximations.
The square root of 48 is between 6 and 7. If we approximate, we can say that 48−−√ is approximately 6.93.
The square root of 36 is 6, so 36−−√ is equal to 6.
Since 6.93 is greater than 6, we can conclude that 48−−√ is greater than 36−−√. Thus, the statement "48−−√>36−−√" is true.
Using rational approximations, what statement is true?(1 point)
Responses
71−−√>61−−√
start root 71 end root greater than start root 61 end root
81−−√>9
start root 81 end root greater than 9
71 −−−√<61−−√
start root 71 end root less than start root 61 end root
81−−√<9
To compare the values 71–√ and 61–√, we can use rational approximations.
The square root of 71 falls between 8 and 9. If we approximate, we can say that 71–√ is approximately 8.4.
The square root of 61 is between 7 and 8. If we approximate, we can say that 61–√ is approximately 7.8.
Since 8.4 is greater than 7.8, we can conclude that 71–√ is greater than 61–√. Thus, the statement "71–√ > 61–√" is true.
To compare the values 81–√ and 9, we can also use rational approximations.
The square root of 81 is exactly 9. Thus, 81–√ is equal to 9.
Since 9 is equal to 9, we can conclude that 81–√ is not less than 9. Thus, the statement "81–√ < 9" is not true.
Using rational approximations, what statement is true?(1 point)
Responses
16−−√>4
start root 16 end root greater than 4
12 −−−√ >π
start root 12 end root greater than pi
16 −−−√<4
start root 16 end root less than 4
12 −−−√<π