To solve the inequality x + 15 ≥ 3, we need to figure out what values of x make the statement true. We can start by subtracting 15 from both sides of the inequality.
x + 15 - 15 ≥ 3 - 15
x ≥ -12
So, x can be any number that is greater than or equal to -12 in order for the inequality to be true.
Now, let's explain it to a 3-year-old:
Imagine you have some toys and you want to share them with your friends. The rule is that you need to have at least 3 toys to share. If you have 15 toys, then you have more than enough to share. But if you have less than 3 toys, then you can't share. So, you need to have 3 toys or more to be able to share with your friends.
solve x + 15 ≥ 3 and explain it to me as a 3 year old
11 answers
so the answer is x ≥ -12??
Yes, that's correct! The solution to the inequality x + 15 ≥ 3 is x ≥ -12. This means that any number equal to or greater than -12 will make the inequality true.
Solve x+212<8
To solve the inequality x + 212 < 8, we need to figure out what values of x make the statement true. We can start by subtracting 212 from both sides of the inequality.
x + 212 - 212 < 8 - 212
x < -204
So, x can be any number that is less than -204 in order for the inequality to be true.
x + 212 - 212 < 8 - 212
x < -204
So, x can be any number that is less than -204 in order for the inequality to be true.
10 > the dot is in between the 4 and 5
It seems like you may be referencing a decimal number. If the number is written as "10.45," it means "10 and forty-five hundredths." In this case, the statement "10 is greater than 4.5" is true.
If this is not what you are referring to or if you have a specific question or equation in mind, please provide more information so I can assist you further.
If this is not what you are referring to or if you have a specific question or equation in mind, please provide more information so I can assist you further.
10 > 4.5
Willow solved an inequality and graphed the solution on the number line. Which of the following inequalities did she solve? (1 point) Responses x+1.25≤5.75 x plus 1.25 less-than-or-equal-to 5.75 x+212<212 x plus 2 Start Fraction 1 over 2 End Fraction less than 2 Start Fraction 1 over 2 End Fraction x−1.5≤3 x minus 1.5 less-than-or-equal-to 3 x−213<216
Willow solved an inequality and graphed the solution on the number line. Which of the following inequalities did she solve? (1 point) Responses x+1.25≤5.75 x plus 1.25 less-than-or-equal-to 5.75 x+212<212 x plus 2 Start Fraction 1 over 2 End Fraction less than 2 Start Fraction 1 over 2 End Fraction x−1.5≤3 x minus 1.5 less-than-or-equal-to 3 x−213<216
Willow solved the inequality x + 1.25 ≤ 5.75 and graphed the solution on the number line. This is the inequality she worked on and graphed the solution for.
here let me put the options
A. x + 1.25 ≤ 5.75
B. x + 2 1/2 < 2 1/2
C.x - 1.5 ≤ 3
D. x - 2 1/3 < 2 1/6
which answer is it??
A. x + 1.25 ≤ 5.75
B. x + 2 1/2 < 2 1/2
C.x - 1.5 ≤ 3
D. x - 2 1/3 < 2 1/6
which answer is it??
The correct answer is:
A. x + 1.25 ≤ 5.75
A. x + 1.25 ≤ 5.75
1 answer