as stated in the first law, the presence of an unbalanced force will accelerate an object - changing either its speed, its direction, or both its speed and direction.
newtons second law of motion pertains to the behavior of objects for which all existing forces are not balanced.
the second law states that the acceleration of an object is dependent upon two variables - the net force acting upon the object and the mass of the object. the acceleration is always in the same direction as the net force.
mathematically this means:
acceleration = $\frac{force_{net}}{mass}$;
commonly written as: $f_{net} = ma$
do not use the value of merely any force in the above equation. it is the net force which is related to acceleration. the net force is the sum of all the forces acting on an object.

critical thinking questions – part iii
1. what two variables is acceleration dependent on? what is the relationship between these variables and acceleration? (i.e. if you increase one variable what happens to the acceleration?)

2. if an object is not accelerating what can you determine about the sum of all the forces on the object?

3. if the net force on an object is in a negative direction, what will the direction of the resulting acceleration be?

4. if you double the net force on an object what is the result on the acceleration?

5. if you double the mass of an object while leaving the net force unchanged what is the result on the acceleration?

6. a cadillac escalade has a mass of 2 569.6 kg, if it accelerates at 4.65m/s² what is the net force on the car?

Question

as stated in the first law, the presence of an unbalanced force will accelerate an object - changing either its speed, its direction, or both its speed and direction.
newtons second law of motion pertains to the behavior of objects for which all existing forces are not balanced.
the second law states that the acceleration of an object is dependent upon two variables - the net force acting upon the object and the mass of the object. the acceleration is always in the same direction as the net force.
mathematically this means:
acceleration = $\frac{force_{net}}{mass}$;
commonly written as: $f_{net} = ma$
do not use the value of merely any force in the above equation. it is the net force which is related to acceleration. the net force is the sum of all the forces acting on an object.

critical thinking questions – part iii
1. what two variables is acceleration dependent on? what is the relationship between these variables and acceleration? (i.e. if you increase one variable what happens to the acceleration?)

2. if an object is not accelerating what can you determine about the sum of all the forces on the object?

3. if the net force on an object is in a negative direction, what will the direction of the resulting acceleration be?

4. if you double the net force on an object what is the result on the acceleration?

5. if you double the mass of an object while leaving the net force unchanged what is the result on the acceleration?

6. a cadillac escalade has a mass of 2 569.6 kg, if it accelerates at 4.65m/s² what is the net force on the car?

Accepted Answer

### Question 1
# Brief Explanations:
Acceleration depends on net force ($F_{net}$) and mass ($m$). From $a=\frac{F_{net}}{m}$, acceleration is directly proportional to net force (increasing $F_{net}$ increases $a$) and inversely proportional to mass (increasing $m$ decreases $a$).
# Answer:
Acceleration depends on net force ($F_{net}$) and mass ($m$). Acceleration is directly proportional to net force (if net force increases, acceleration increases) and inversely proportional to mass (if mass increases, acceleration decreases).

### Question 2
# Brief Explanations:
From $F_{net} = ma$, if $a = 0$ (not accelerating), then $F_{net}=m\times0 = 0$. So the sum of all forces (net force) is zero.
# Answer:
The sum of all the forces (net force) on the object is zero.

### Question 3
# Brief Explanations:
The text states acceleration is in the same direction as net force. So if net force is negative, acceleration is negative (same direction).
# Answer:
The direction of the resulting acceleration will be negative (same as the net force direction).

### Question 4
# Brief Explanations:
From $a=\frac{F_{net}}{m}$, if $m$ is constant and $F_{net}$ doubles ($F_{net}' = 2F_{net}$), then $a'=\frac{2F_{net}}{m}=2\times\frac{F_{net}}{m}=2a$. So acceleration doubles.
# Answer:
The acceleration will double.

### Question 5
# Brief Explanations:
From $a=\frac{F_{net}}{m}$, if $F_{net}$ is constant and $m$ doubles ($m' = 2m$), then $a'=\frac{F_{net}}{2m}=\frac{1}{2}\times\frac{F_{net}}{m}=\frac{a}{2}$. So acceleration halves.
# Answer:
The acceleration will be halved (decrease to half of its original value).

### Question 6
# Explanation:
## Step1: Recall the formula
We use the formula $F_{net}=ma$, where $m = 2569.6\space kg$ and $a = 4.65\space m/s^{2}$.
## Step2: Substitute values
Substitute $m$ and $a$ into the formula: $F_{net}=2569.6\times4.65$.
## Step3: Calculate the product
$2569.6\times4.65 = 2569.6\times(4 + 0.6 + 0.05)=2569.6\times4+2569.6\times0.6 + 2569.6\times0.05=10278.4+1541.76 + 128.48 = 11948.64\space N$.
# Answer:
The net force on the car is $11948.64\space N$ (or approximately $1.19\times10^{4}\space N$ depending on significant figures).

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