What is the value of g
, if g⎯⎯√3=−7
?
To solve for g, we can square both sides of the equation:
(g√3)^2 = (-7)^2
g^2 * 3 = 49
g^2 = 49/3
g = ±√(49/3)
Thus, the value of g is ±√(49/3). Depending on whether we take the positive or negative square root, g can be a positive or negative value.
To find the value of g when g√3 = -7, we need to isolate g.
First, let's divide both sides of the equation by √3:
g = -7 / √3
To rationalize the denominator, we multiply both the numerator and denominator by √3:
g = (-7 / √3) * (√3 / √3)
This simplifies to:
g = -7√3 / 3
Therefore, the value of g is -7√3 / 3.
To find the value of g, we can solve the equation g√3 = -7 for g.
First, let's isolate g by dividing both sides of the equation by √3:
g = -7 / √3
To simplify the numerator, multiply by √3/√3:
g = -7√3 / (√3 * √3)
Simplifying the denominator:
g = -7√3 / 3
Thus, the value of g is -7√3/3.