Sketch the graph of the quadratic functions in Exercises 1 and 2, indicating the coordinates of the vertex, the y-intercept, and the x-intercepts (if any). f ( x ) = x 2 + 2 x − 3

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Answer 1

Textbook Question

Chapter 2, Problem 1RE

Sketch the graph of the quadratic functions in Exercises 1 and 2, indicating the coordinates of the vertex, the y-intercept, and the x-intercepts (if any).

f ( x ) = x 2 + 2 x − 3

Expert Solution & Answer

To determine

To graph: The function f(x)=x2+2x−3 and indicate the coordinates of the vertex, the y-intercept, and x-intercept.

Explanation of Solution

Given Information:

The provided function is f(x)=x2+2x−3.

Graph:

Consider the function,

f(x)=x2+2x−3

Compare the equation f(x)=x2+2x−3 with the standard function f(x)=ax2+bx+c and find the value of a,b and c.

The values are a=1,b=2 and c=−3.

Here a>0, therefore the parabola will be upward facing,

To graph a quadratic function, four things should be calculated first.

(i) Vertex

(ii) x-intercept

(iii)y-intercept

(iv) Symmetry

Vertex: The formula of x- coordinate of a vertex is,

x=−b2a

Substitute a=1 and b=2 in the equation x=−b2a.

x=−22⋅1=−22=−1

To find the y-coordinate of vertex, substitute x=−1 in the function f(x)=x2+2x−3.

f(x)=(−1)2+3(−1)+2=1−3+2=0

Thus, coordinates of the vertex are (−1,0).

To calculate the x-intercept of the function, substitute f(x)=0 in the equation f(x)=x2+2x−3 and solve.

x2+2x−3=0x2+3x−x−3=0x(x+3)−1(x+3)=0(x+3)(x−1)=0

Therefore, x+3=0 or x−1=0.

Now solve for x+3=0.

x+3=0x=−3

Now solve for x−1=0.

x−1=0x=1

Thus, x-intercept are −3, 1.

To calculate the y-intercept, substitute x=0 in the function f(x)=x2+2x−3.

f(x)=(0)2+2(0)−3=−3

Thus, the y-intercept is −3.

Symmetry:

The formula of the symmetry line is,

x=−b2a

Substitute a=1 and b=2 in the equation x=−b2a.

x=−22⋅1=−22=−1

So, the line of symmetry is x=−1.

Now plot the graph.

Finite Mathematics and Applied Calculus (MindTap Course List), Chapter 2, Problem 1RE

Interpretation:

The graph of f(x)=x2+2x−3 represents a parabola which is upward facing. Also, the vertex is (−1,−4), the y-intercept −3, and x-intercept are −3 and 1.

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Answer 2

Textbook Question

Chapter 2, Problem 1RE

Sketch the graph of the quadratic functions in Exercises 1 and 2, indicating the coordinates of the vertex, the y-intercept, and the x-intercepts (if any).

f ( x ) = x 2 + 2 x − 3

Expert Solution & Answer

To determine

To graph: The function f(x)=x2+2x−3 and indicate the coordinates of the vertex, the y-intercept, and x-intercept.

Explanation of Solution

Given Information:

The provided function is f(x)=x2+2x−3.

Graph:

Consider the function,

f(x)=x2+2x−3

Compare the equation f(x)=x2+2x−3 with the standard function f(x)=ax2+bx+c and find the value of a,b and c.

The values are a=1,b=2 and c=−3.

Here a>0, therefore the parabola will be upward facing,

To graph a quadratic function, four things should be calculated first.

(i) Vertex

(ii) x-intercept

(iii)y-intercept

(iv) Symmetry

Vertex: The formula of x- coordinate of a vertex is,

x=−b2a

Substitute a=1 and b=2 in the equation x=−b2a.

x=−22⋅1=−22=−1

To find the y-coordinate of vertex, substitute x=−1 in the function f(x)=x2+2x−3.

f(x)=(−1)2+3(−1)+2=1−3+2=0

Thus, coordinates of the vertex are (−1,0).

To calculate the x-intercept of the function, substitute f(x)=0 in the equation f(x)=x2+2x−3 and solve.

x2+2x−3=0x2+3x−x−3=0x(x+3)−1(x+3)=0(x+3)(x−1)=0

Therefore, x+3=0 or x−1=0.

Now solve for x+3=0.

x+3=0x=−3

Now solve for x−1=0.

x−1=0x=1

Thus, x-intercept are −3, 1.

To calculate the y-intercept, substitute x=0 in the function f(x)=x2+2x−3.

f(x)=(0)2+2(0)−3=−3

Thus, the y-intercept is −3.

Symmetry:

The formula of the symmetry line is,

x=−b2a

Substitute a=1 and b=2 in the equation x=−b2a.

x=−22⋅1=−22=−1

So, the line of symmetry is x=−1.

Now plot the graph.

Finite Mathematics and Applied Calculus (MindTap Course List), Chapter 2, Problem 1RE

Interpretation:

The graph of f(x)=x2+2x−3 represents a parabola which is upward facing. Also, the vertex is (−1,−4), the y-intercept −3, and x-intercept are −3 and 1.

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Answer 3

Textbook Question

Chapter 2, Problem 1RE

Sketch the graph of the quadratic functions in Exercises 1 and 2, indicating the coordinates of the vertex, the y-intercept, and the x-intercepts (if any).

f ( x ) = x 2 + 2 x − 3

Expert Solution & Answer

To determine

To graph: The function f(x)=x2+2x−3 and indicate the coordinates of the vertex, the y-intercept, and x-intercept.

Explanation of Solution

Given Information:

The provided function is f(x)=x2+2x−3.

Graph:

Consider the function,

f(x)=x2+2x−3

Compare the equation f(x)=x2+2x−3 with the standard function f(x)=ax2+bx+c and find the value of a,b and c.

The values are a=1,b=2 and c=−3.

Here a>0, therefore the parabola will be upward facing,

To graph a quadratic function, four things should be calculated first.

(i) Vertex

(ii) x-intercept

(iii)y-intercept

(iv) Symmetry

Vertex: The formula of x- coordinate of a vertex is,

x=−b2a

Substitute a=1 and b=2 in the equation x=−b2a.

x=−22⋅1=−22=−1

To find the y-coordinate of vertex, substitute x=−1 in the function f(x)=x2+2x−3.

f(x)=(−1)2+3(−1)+2=1−3+2=0

Thus, coordinates of the vertex are (−1,0).

To calculate the x-intercept of the function, substitute f(x)=0 in the equation f(x)=x2+2x−3 and solve.

x2+2x−3=0x2+3x−x−3=0x(x+3)−1(x+3)=0(x+3)(x−1)=0

Therefore, x+3=0 or x−1=0.

Now solve for x+3=0.

x+3=0x=−3

Now solve for x−1=0.

x−1=0x=1

Thus, x-intercept are −3, 1.

To calculate the y-intercept, substitute x=0 in the function f(x)=x2+2x−3.

f(x)=(0)2+2(0)−3=−3

Thus, the y-intercept is −3.

Symmetry:

The formula of the symmetry line is,

x=−b2a

Substitute a=1 and b=2 in the equation x=−b2a.

x=−22⋅1=−22=−1

So, the line of symmetry is x=−1.

Now plot the graph.

Finite Mathematics and Applied Calculus (MindTap Course List), Chapter 2, Problem 1RE

Interpretation:

The graph of f(x)=x2+2x−3 represents a parabola which is upward facing. Also, the vertex is (−1,−4), the y-intercept −3, and x-intercept are −3 and 1.

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Subscribe now to access step-by-step solutions to millions of textbook problems written by subject matter experts!

Answer 4

Textbook Question

Chapter 2, Problem 1RE

Sketch the graph of the quadratic functions in Exercises 1 and 2, indicating the coordinates of the vertex, the y-intercept, and the x-intercepts (if any).

f ( x ) = x 2 + 2 x − 3

Expert Solution & Answer

To determine

To graph: The function f(x)=x2+2x−3 and indicate the coordinates of the vertex, the y-intercept, and x-intercept.

Explanation of Solution

Given Information:

The provided function is f(x)=x2+2x−3.

Graph:

Consider the function,

f(x)=x2+2x−3

Compare the equation f(x)=x2+2x−3 with the standard function f(x)=ax2+bx+c and find the value of a,b and c.

The values are a=1,b=2 and c=−3.

Here a>0, therefore the parabola will be upward facing,

To graph a quadratic function, four things should be calculated first.

(i) Vertex

(ii) x-intercept

(iii)y-intercept

(iv) Symmetry

Vertex: The formula of x- coordinate of a vertex is,

x=−b2a

Substitute a=1 and b=2 in the equation x=−b2a.

x=−22⋅1=−22=−1

To find the y-coordinate of vertex, substitute x=−1 in the function f(x)=x2+2x−3.

f(x)=(−1)2+3(−1)+2=1−3+2=0

Thus, coordinates of the vertex are (−1,0).

To calculate the x-intercept of the function, substitute f(x)=0 in the equation f(x)=x2+2x−3 and solve.

x2+2x−3=0x2+3x−x−3=0x(x+3)−1(x+3)=0(x+3)(x−1)=0

Therefore, x+3=0 or x−1=0.

Now solve for x+3=0.

x+3=0x=−3

Now solve for x−1=0.

x−1=0x=1

Thus, x-intercept are −3, 1.

To calculate the y-intercept, substitute x=0 in the function f(x)=x2+2x−3.

f(x)=(0)2+2(0)−3=−3

Thus, the y-intercept is −3.

Symmetry:

The formula of the symmetry line is,

x=−b2a

Substitute a=1 and b=2 in the equation x=−b2a.

x=−22⋅1=−22=−1

So, the line of symmetry is x=−1.

Now plot the graph.

Finite Mathematics and Applied Calculus (MindTap Course List), Chapter 2, Problem 1RE

Interpretation:

The graph of f(x)=x2+2x−3 represents a parabola which is upward facing. Also, the vertex is (−1,−4), the y-intercept −3, and x-intercept are −3 and 1.

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Subscribe now to access step-by-step solutions to millions of textbook problems written by subject matter experts!

Answer 5

Textbook Question

Answer 6

Textbook Question

Answer 7

Expert Solution & Answer

To determine

To graph: The function f(x)=x2+2x−3 and indicate the coordinates of the vertex, the y-intercept, and x-intercept.

Explanation of Solution

Given Information:

The provided function is f(x)=x2+2x−3.

Graph:

Consider the function,

f(x)=x2+2x−3

Compare the equation f(x)=x2+2x−3 with the standard function f(x)=ax2+bx+c and find the value of a,b and c.

The values are a=1,b=2 and c=−3.

Here a>0, therefore the parabola will be upward facing,

To graph a quadratic function, four things should be calculated first.

(i) Vertex

(ii) x-intercept

(iii)y-intercept

(iv) Symmetry

Vertex: The formula of x- coordinate of a vertex is,

x=−b2a

Substitute a=1 and b=2 in the equation x=−b2a.

x=−22⋅1=−22=−1

To find the y-coordinate of vertex, substitute x=−1 in the function f(x)=x2+2x−3.

f(x)=(−1)2+3(−1)+2=1−3+2=0

Thus, coordinates of the vertex are (−1,0).

To calculate the x-intercept of the function, substitute f(x)=0 in the equation f(x)=x2+2x−3 and solve.

x2+2x−3=0x2+3x−x−3=0x(x+3)−1(x+3)=0(x+3)(x−1)=0

Therefore, x+3=0 or x−1=0.

Now solve for x+3=0.

x+3=0x=−3

Now solve for x−1=0.

x−1=0x=1

Thus, x-intercept are −3, 1.

To calculate the y-intercept, substitute x=0 in the function f(x)=x2+2x−3.

f(x)=(0)2+2(0)−3=−3

Thus, the y-intercept is −3.

Symmetry:

The formula of the symmetry line is,

x=−b2a

Substitute a=1 and b=2 in the equation x=−b2a.

x=−22⋅1=−22=−1

So, the line of symmetry is x=−1.

Now plot the graph.

Finite Mathematics and Applied Calculus (MindTap Course List), Chapter 2, Problem 1RE

Interpretation:

The graph of f(x)=x2+2x−3 represents a parabola which is upward facing. Also, the vertex is (−1,−4), the y-intercept −3, and x-intercept are −3 and 1.

Answer 8

Expert Solution & Answer

To determine

To graph: The function f(x)=x2+2x−3 and indicate the coordinates of the vertex, the y-intercept, and x-intercept.

Explanation of Solution

Given Information:

The provided function is f(x)=x2+2x−3.

Graph:

Consider the function,

f(x)=x2+2x−3

Compare the equation f(x)=x2+2x−3 with the standard function f(x)=ax2+bx+c and find the value of a,b and c.

The values are a=1,b=2 and c=−3.

Here a>0, therefore the parabola will be upward facing,

To graph a quadratic function, four things should be calculated first.

(i) Vertex

(ii) x-intercept

(iii)y-intercept

(iv) Symmetry

Vertex: The formula of x- coordinate of a vertex is,

x=−b2a

Substitute a=1 and b=2 in the equation x=−b2a.

x=−22⋅1=−22=−1

To find the y-coordinate of vertex, substitute x=−1 in the function f(x)=x2+2x−3.

f(x)=(−1)2+3(−1)+2=1−3+2=0

Thus, coordinates of the vertex are (−1,0).

To calculate the x-intercept of the function, substitute f(x)=0 in the equation f(x)=x2+2x−3 and solve.

x2+2x−3=0x2+3x−x−3=0x(x+3)−1(x+3)=0(x+3)(x−1)=0

Therefore, x+3=0 or x−1=0.

Now solve for x+3=0.

x+3=0x=−3

Now solve for x−1=0.

x−1=0x=1

Thus, x-intercept are −3, 1.

To calculate the y-intercept, substitute x=0 in the function f(x)=x2+2x−3.

f(x)=(0)2+2(0)−3=−3

Thus, the y-intercept is −3.

Symmetry:

The formula of the symmetry line is,

x=−b2a

Substitute a=1 and b=2 in the equation x=−b2a.

x=−22⋅1=−22=−1

So, the line of symmetry is x=−1.

Now plot the graph.

Finite Mathematics and Applied Calculus (MindTap Course List), Chapter 2, Problem 1RE

Interpretation:

The graph of f(x)=x2+2x−3 represents a parabola which is upward facing. Also, the vertex is (−1,−4), the y-intercept −3, and x-intercept are −3 and 1.

Answer 9

Expert Solution & Answer

Answer 10

Expert Solution & Answer

Answer 11

To determine

To graph: The function f(x)=x2+2x−3 and indicate the coordinates of the vertex, the y-intercept, and x-intercept.

Answer 12

Explanation of Solution

Given Information:

The provided function is f(x)=x2+2x−3.

Graph:

Consider the function,

f(x)=x2+2x−3

Compare the equation f(x)=x2+2x−3 with the standard function f(x)=ax2+bx+c and find the value of a,b and c.

The values are a=1,b=2 and c=−3.

Here a>0, therefore the parabola will be upward facing,

To graph a quadratic function, four things should be calculated first.

(i) Vertex

(ii) x-intercept

(iii)y-intercept

(iv) Symmetry

Vertex: The formula of x- coordinate of a vertex is,

x=−b2a

Substitute a=1 and b=2 in the equation x=−b2a.

x=−22⋅1=−22=−1

To find the y-coordinate of vertex, substitute x=−1 in the function f(x)=x2+2x−3.

f(x)=(−1)2+3(−1)+2=1−3+2=0

Thus, coordinates of the vertex are (−1,0).

To calculate the x-intercept of the function, substitute f(x)=0 in the equation f(x)=x2+2x−3 and solve.

x2+2x−3=0x2+3x−x−3=0x(x+3)−1(x+3)=0(x+3)(x−1)=0

Therefore, x+3=0 or x−1=0.

Now solve for x+3=0.

x+3=0x=−3

Now solve for x−1=0.

x−1=0x=1

Thus, x-intercept are −3, 1.

To calculate the y-intercept, substitute x=0 in the function f(x)=x2+2x−3.

f(x)=(0)2+2(0)−3=−3

Thus, the y-intercept is −3.

Symmetry:

The formula of the symmetry line is,

x=−b2a

Substitute a=1 and b=2 in the equation x=−b2a.

x=−22⋅1=−22=−1

So, the line of symmetry is x=−1.

Now plot the graph.

Finite Mathematics and Applied Calculus (MindTap Course List), Chapter 2, Problem 1RE

Interpretation:

The graph of f(x)=x2+2x−3 represents a parabola which is upward facing. Also, the vertex is (−1,−4), the y-intercept −3, and x-intercept are −3 and 1.

Answer 13

Ch. 2.1 - In Exercises 16, (a) state the values of a, b, and...Ch. 2.1 - In Exercises 16, (a) state the values of a, b, and...Ch. 2.1 - In Exercises 16, (a) state the values of a, b, and...Ch. 2.1 - In Exercises 16, (a) state the values of a, b, and...Ch. 2.1 - In Exercises 16, (a) state the values of a, b, and...Ch. 2.1 - Prob. 6E Ch. 2.1 - Prob. 7E Ch. 2.1 - Prob. 8E Ch. 2.1 - In Exercises 716, sketch the graph of the...Ch. 2.1 - Prob. 10E

Sketch the graph of the quadratic functions in Exercises 1 and 2, indicating the coordinates of the vertex, the y-intercept, and the x-intercepts (if any). f ( x ) = x 2 + 2 x − 3

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