Kevin has 23 dimes and quarters in his piggy bank. If the value of these coins is $4.55, how many dimes and quarters does he have? Set up and solve a system of equations to solve the problem

Answer:

Time of driving of Maria = 1.8 hours

Step-by-step explanation:

Let a be time drove by Carlos and b be the time drove by Maria.

Carlos and Maria drove a total of 233 miles in 4.4 hours.

Total time = 4.4 hours

           a + b = 4.4 ------------------eqn 1

Carlos drove the first part of the trip and averaged 55 miles per hour. Maria drove the remainder of the trip and averaged 50 miles per hour.    

    Speed of Carlos =   55 miles per hour

    Speed of Maria =   50 miles per hour      

Total distance = 233 miles

That is

              55 a + 50 b = 233----------------------eqn 2

eqn 1 x 50

              50 a + 50 b = 220---------------------------eqn 3

eqn 3 - eqn 2

             55 a + 50 b -    50 a - 50 b   = 233 - 220

                  5a = 13

                   a = 2.6

Substituting in eqn 1

                2.6 + b = 4.4

                          b = 1.8

Time of driving of Maria = 1.8 hours

Answer:

Discriminant of the quadratic is-23

Step-by-step explanation:

The given quadratic function is [tex]3x^2-7x+6[/tex]

Comparing with the expression [tex]ax^2+bx+c[/tex]

a = 3, b = -7, c = 6

The discriminant of the quadratic is given by [tex]D=b^2-4ac[/tex]

Substituting the known values, discriminant of the quadratic is

[tex]D=(-7)^2-4(3)(6)\\\\D=49-72\\\\D=-23[/tex]

Therefore, discriminant of the quadratic is-23

Answer:

The trigonometric ratio for [tex]\sin C[/tex] is  [tex]\frac{9}{41}[/tex]

Step-by-step explanation:

Given : A right triangle ABC with  ∠B = 90° and AC = 82 and BC = 80

We have to find the value of [tex]\sin C[/tex]

Since, Sine is defined as the ratio of perpendicular to its hypotenuse.

Mathematically written as [tex]\sin\theta=\frac{Perpendicular}{Hypotenuse}[/tex]

For the given triangle ABC, we have

Using Pythagoras theorem, For a right angled triangle, sum of square of base and perpendicular is equal to the square to its hypotenuse.

[tex](AC)^2=(AB)^2+(BC)^2[/tex]

Substitute, we get,

[tex](82)^2-(80)^2=(AB)^2\\\\ 6724-6400=(AB)^2\\\\ 324=(AB)^2\\\\ \Rightarrow AB =18[/tex]

[tex]\theta=C[/tex]

So, perpendicular = AB and Hypotenuse = AC

[tex]\sin C=\frac{AB}{AC}[/tex]

[tex]\sin C=\frac{18}{82}=\frac{9}{41}[/tex]

Thus, The trigonometric ratio for [tex]\sin C[/tex] is  [tex]\frac{9}{41}[/tex]

The greatest common factor (GCF) of [tex]28x^{3}[/tex] and  [tex]16x^{2} y^{2}[/tex] is the greatest common factor (GCF) of and  [tex]16x^{2} y^{2}[/tex] is [tex]4x^{2}[/tex] .

To find the greatest common factor (GCF) of  [tex]28x^{3}[/tex] and [tex]16x^{2} y^{2}[/tex]

, we need to identify the common factors between the two expressions.

The prime factorization of  is [tex]2.2.7.x.x.x.[/tex]

The prime factorization of [tex]16x^{2} y^{2}[/tex]  is [tex]2.2.2.2.x.x.y.y.[/tex]

Now, let's identify the common factors:

Both expressions have [tex]2.2.x.x[/tex] in common.

So, the greatest common factor (GCF) of and [tex]16x^{2} y^{2}[/tex] is [tex]4x^{2}[/tex] .

COMPLETE QUESTION:

Circle the GCF of [tex]28x^{3}[/tex] and [tex]16x^{2} y^{2}[/tex]

[tex]28x^{3}[/tex]: [tex]2.2.7[/tex].*•*•*

[tex]16x^{2} y^{2}[/tex]:[tex]2.2.2.2.x.x.y.y[/tex]

Adding any rational number to 1/2 results in another rational number, because rational numbers can always be expressed as fractions with integers as numerators and denominators, making addition straightforward by finding a common denominator.

Any number that can be expressed as a fraction where both the numerator and denominator are integers (excluding zero as the denominator) will produce a rational number when added to 1/2. For example, adding 1/2 to 3 (which is the same as 3/1) will yield 3 1/2 or 7/2, still a rational number. By definition, rational numbers include integers, finite decimals, and repeating or terminating decimals, as they can all be represented as fractions.

Understanding Rational Numbers:

To solve the more difficult problem, one might need to find common denominators when working with more complex fractions. For instance, adding 1/2 to 2/3 requires a common denominator: 3/6 + 4/6 = 7/6. The key point here is that when you add any rational number to another rational number (like 1/2), the result will be rational because you can find a common denominator and then add the numerators, keeping that same common denominator.

The value of the distance between the points (2, 3) and (2, 8) is,

⇒ d = 5 units

A pair of numbers which describe the exact position of a point on a cartesian plane by using the horizontal and vertical lines is called the coordinates.

Given that;

To find the distance between the points (2, 3) and (2, 8).

Since, The distance between two points (x₁ , y₁) and (x₂, y₂) is,

⇒ d = √ (x₂ - x₁)² + (y₂ - y₁)²

Thus, The value of the distance between the points (2, 3) and (2, 8) is,

⇒ d = √(2 - 2)² + (8 - 3)²

⇒ d = √5²

⇒ d = 5 units

Thus, The value of the distance between the points (2, 3) and (2, 8) is,

⇒ d = 5 units

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Well . . .

4 out of 12 eggs makes the fraction 4/12 for pancakes.

3 out of 12 eggs makes the fraction 3/12 for cupcakes.

4/12 + 3/12 + 7/12

If you don’t know how to do it here you go judging by how easy the question is -

Only add the numerator (top) and keep the denominator (bottom) the same.

Hope this helps :)

The expression (20-4x)/4 equals 5 - x.

Given is an expression (20-4x)/4 we need to find an equivalent expression to it,

A mathematical expression or equation that is equivalent to another expression or equation is one that has the same value or meaning.

In other words, if two phrases yield the same result or depict the same mathematical relationship, they are deemed equal.

So,

By multiplying each word in the brackets by 4, it is possible to simplify the formula (20-4x)/4.

This results in:

(20/4) - (4x/4)

Simplifying even more

5 - x

Therefore, the expression (20-4x)/4 equals 5 - x.

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Answer:

i) The general formula to find the surface area of a prism = ph + 2B

ii) The area of the triangular prism = ph + 2([tex]\frac{1}{2} bh[/tex])

Step-by-step explanation:

A prism is a three-dimensional figure. The surface area of a figure is the sum of all the areas of its sides.

For example, rectangular prism has 6 sides, to find the surface of rectangular prism, we need to find the area of each side and add them together to get the surface area.

So, the general formula to find the surface area of a prism = ph + 2B, where "p" is the perimeter of the base, "h" is the height of the prism and B is the area of the base.

Now let's find the area of triangular prism.

In the triangular prism, there are two triangles and three rectangles.

Area of a triangle = [tex]\frac{1}{2} bh[/tex]

So, the area of the triangular prism = ph + 2([tex]\frac{1}{2} bh[/tex])

The minimum volume of hot air needed to lift a hot air balloon carrying 800 kg is 3200 m³.

The minimum volume of hot air needed to lift a hot air balloon carrying 800 kg can be calculated by using the density difference between hot air and cool air. Given that the density of hot air is about 0.25 kg/m³ less than that of cool air, we can calculate the volume of hot air needed.

Let V be the volume of hot air needed. The weight of the hot air balloon is equal to the weight of the cool air displaced by the hot air balloon. So we can set up the equation 800 kg = ((V + 1) - V) x 0.25 kg/m³, where 1 represents the volume of the hot air balloon itself.

Simplifying the equation, we have 800 kg = 0.25 kg/m x 1 m³, which gives us V = 800/0.25 = 3200 m³. Therefore, the minimum volume of hot air needed to lift the hot air balloon carrying 800 kg is 3200 m³.

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Answer:

For Equation 1:

For Equation 2:

Step-by-step explanation:

We are given two lines - one is an equation and one is an inequality.

Neither are in slope-intercept form (y = mx + b), so we need to make these adjustments.

Slope-intercept form has two key parts to the equation: m, which is the slope of the line and b, which is the y-intercept of the line.

Equation 1

[tex]\displaystyle2x+3y=18\\\\3y = -2x + 18\\\\y = -\frac{2}{3}x+6[/tex]

With this, we can now determine the domain, range, slope, and y-intercepts for this line.

For Equation 1, because our equation is in slope-intercept form, we can find the slope and the y-intercept.

Our equation is [tex]y=-\frac{2}{3}x+6[/tex]. Therefore, our m is [tex]-\frac{2}{3}[/tex] and our b is 6.

Because the equation is linear, there is no instance in which the line will not meet an x- or y-value. Therefore, our domain and range is all real numbers, or [tex]\mathbb{R}[/tex].

Equation 2

[tex]\displaystyle3x-4y>16\\\\-4y>-3x+16\\\\y < \frac{3}{4}x-4[/tex]

Now that we have solved the inequality, we can determine our slope, the domain, and the range of the function.

We can use the same tactic as before - m is our slope and b is our y-intercept. Therefore, [tex]\frac{3}{4}[/tex] is our slope and -4 is our y-intercept.

Because the inequality represents a line, our domain is all real numbers, or [tex]\mathbb{R}[/tex]. If we were to plug in any number for x, y would be true for that value. Therefore, our range is also all real numbers, or [tex]\mathbb{R}[/tex].

Answer:

Increased by a factor of 4

Step-by-step explanation:

Answer:

6 meters.

Step-by-step explanation:

Let w represent width of the rectangle.

We have been given that the area of a rectangle playground is 78 square meters. The length of the playground is 13 meters.

We know that area of a rectangle is width times length of rectangle. We can represent our given information in an equation as:

[tex]\text{Area of rectangle}=\text{Length}\times \text{Width}[/tex]

[tex]78\text{ m}^2=13\text{ m}\times \text{Width}[/tex]

[tex]13\text{ m}\times \text{Width}=78\text{ m}^2[/tex]

[tex]\frac{13\text{ m}\times \text{Width}}{13\text{ m}}=\frac{78\text{ m}^2}{13\text{ m}}[/tex]

[tex]\text{Width}=6\text{ m}[/tex]

Therefore, the width of the rectangle is 6 meters.