The solution of d+s>−3 is d>−7. What is the value of s?
To find the value of s, we can rewrite the given inequality:
d + s > -3
Since we know that d > -7, we can substitute it into the inequality:
-7 + s > -3
Now, let's isolate s by subtracting -7 from both sides of the inequality:
s > -3 + 7
This simplifies to:
s > 4
Therefore, the value of s is greater than 4.
To find the value of s, we need to manipulate the given inequality, d+s > -3, to isolate s.
Given inequality: d + s > -3
Subtracting d from both sides: (d + s) - d > -3 - d
Simplifying: s > -3 - d
To isolate s, we need to rearrange the inequality to have s on one side. Since we know that d > -7, we can substitute this value into the expression.
Substituting d > -7 into the inequality: s > -3 - (-7)
Simplifying: s > -3 + 7
Further simplifying: s > 4
Therefore, the value of s is greater than 4.
thats all they give us
No way to tell
d=0: s > -3
d=-6: s > 3
d=100: s > -103