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If the equation below is solved by graphing, which statement is true?
log(6x+10)=log1/2x
The curves intersect at approximately x = 0.46.
The curves intersect at approximately x = 0.75.
The curves intersect at approximately x = 1.11.
The curves intersect at approximately x = 3.07.

Respuesta :

Answer:

.46

Step-by-step explanation:

If you graph the function, you can see where the two logs intersects. View the image I have attached.

Ver imagen Аноним

Answer:

If the equation log(6x+10)=log(1/2) x is solved by graphing, the curves intersect at approximately x=0.46

Step-by-step explanation:

Equation

log(6x+10)=log(1/2) x

We must graph two functions:

f(x)=log(6x+10) and

g(x)=log(1/2) x→g(x)=log0.5 x

If we graph these two equation the point of intersection is approximately (0.464, 1.107)=(x,y)

x=0.464→x=0.46

y=1.107→y=1.11

Ver imagen Professor1994