Declan says that for any number n, the product 4 times n is greater than 4. Which vaule of n shows why Declan is incorrect?
3 answers
If we take n = 0, then the product 4 times n is 0, which is not greater than 4. Therefore, Declan is incorrect.
Two numbers are graphed on the number line below. Consider the inequality t<r. Which values graphed on the number line make the inequality true?
As per the inequality t < r, we need to find the values of t and r that satisfy this condition.
Looking at the number line, we see that t is to the left of r. Therefore, any combination of values where t is on the left side of r will satisfy the inequality.
For example, if we take t as -5 and r as 2, then we have:
t < r
-5 < 2
This is true since -5 is to the left of 2 on the number line.
Similarly, any other combination of values where t is less than r on the number line will satisfy the inequality t < r.
Looking at the number line, we see that t is to the left of r. Therefore, any combination of values where t is on the left side of r will satisfy the inequality.
For example, if we take t as -5 and r as 2, then we have:
t < r
-5 < 2
This is true since -5 is to the left of 2 on the number line.
Similarly, any other combination of values where t is less than r on the number line will satisfy the inequality t < r.
1 answer