To write the inequality for the given problem, let's use \( x \) to represent the number we are trying to find. According to the problem, the sum of 11 and three-fourths of this number is less than 112. In equation form, the relationship is:
\[ \frac{3}{4}x + 11 < 112 \]
This inequality represents all the possible values of \( x \) that satisfy the given condition. To write the inequality with the \( x \) term first, we don't need to change anything since it is already in the desired format.
Inequality:
\[ \frac{3}{4}x + 11 < 112 \]
the sum of 11 and three Forths of a number is less than 112. what are all the possible values of the number? write an inequantity that could be used to solve this problem. use the letter x as the variable, and write the inequantity so that the x term comes first. where necessary write numbers as fractions (rather than decimals) do not solve the inequantity.
7 answers
you are wrong AGAIN.
I apologize for any confusion caused. Let me clarify:
The problem states that the sum of 11 and three-fourths of a number (x) is less than 112. To represent this as an inequality with x coming first and using a fraction rather than a decimal, we would write:
\[ \frac{3}{4}x + 11 < 112 \]
This is the inequality you would solve to find all possible values of the number x that satisfy the given condition. If there was an oversight or you require a different representation, please let me know how I can assist you further.
The problem states that the sum of 11 and three-fourths of a number (x) is less than 112. To represent this as an inequality with x coming first and using a fraction rather than a decimal, we would write:
\[ \frac{3}{4}x + 11 < 112 \]
This is the inequality you would solve to find all possible values of the number x that satisfy the given condition. If there was an oversight or you require a different representation, please let me know how I can assist you further.
DUDE ARE YOU STUPED WHY CANT YOU GET IT WRITE UGG
I apologize if my previous responses were not clear or if they seemed incorrect. Let's work through the problem again step by step.
The problem states: "The sum of 11 and three-fourths of a number is less than 112."
So we're looking for a number, which we'll call x, and three-fourths of this number would be (3/4)x. We add 11 to this and the total should be less than 112.
The inequality to represent this situation would be:
(3/4)x + 11 < 112
This inequality is written as requested with x first and using a fractional representation for three-fourths. This is the correct inequality based on the problem statement provided. If there is still a misunderstanding or further clarification needed, please let me know and I will be happy to correct it.
The problem states: "The sum of 11 and three-fourths of a number is less than 112."
So we're looking for a number, which we'll call x, and three-fourths of this number would be (3/4)x. We add 11 to this and the total should be less than 112.
The inequality to represent this situation would be:
(3/4)x + 11 < 112
This inequality is written as requested with x first and using a fractional representation for three-fourths. This is the correct inequality based on the problem statement provided. If there is still a misunderstanding or further clarification needed, please let me know and I will be happy to correct it.
thank you was it that hard
I apologize for any confusion or frustration earlier on. Thank you for your patience, and I'm glad we could clarify the inequality for the problem:
\[ \frac{3}{4}x + 11 < 112 \]
If you have any more questions or need further assistance, please feel free to ask.
\[ \frac{3}{4}x + 11 < 112 \]
If you have any more questions or need further assistance, please feel free to ask.
4 answers