Which of the following is an arithmetic sequence?
a -7/11,6/11, -5/11, 4/11
b -3/4, -3/5, -3/6, -3/7
c 1/2,2,7/2,5
d 3/4,-3/2, 3, -6

Sue divides the initial number (which is 20/3 in this case) by 3, adds 1, and then multiplies by 4. Simplifying this we find her result to be 80/9 or 8 8/9.

Let's denote the initial number as 'x'. If Joe multiplies 'x' by 4, adds 1 and then divides by 3, getting 7, we can say that (4x+1)/3 = 7. Solving this equation, we find that x = 20/3.

Now let's apply this value to Sue's operations. Sue divides the initial number (which is 20/3) by 3, adds 1, and then multiplies by 4. Therefore, Sue's result is 4*((20/3)/3 + 1). Simplifying this expression, we obtain that Sue's result is 80/9 or 8 8/9.

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Final answer:

To divide 6 feet 6 inches by 5, convert the length to inches, divide by 5, then convert back to feet and inches, resulting in 1 foot 3 inches per section.

Explanation:

To divide 6 feet 6 inches by 5, first convert the entire length to inches. Since there are 12 inches in 1 foot, 6 feet equals 72 inches (6 feet x 12 inches/foot). Adding the additional 6 inches gives us a total of 78 inches. Now, divide 78 inches by 5 to find the length of each section.

78 inches ÷ 5 = 15.6 inches per section.

To convert this back to feet and inches, remember that there are 12 inches in a foot. Therefore, 15 inches is 1 foot 3 inches, and the remaining 0.6 inches can be expressed as a fraction of an inch (0.6 x 12 = 7.2, which is approximately 7 inches). So, each section is 1 foot 3 inches.

 I believe the given sequence is in the tabular form of:

n             value

1              - 3

2              - 3.5

3              - 6.75

4              - 10.125

5              - 15.1875

6              - 22.78125

Now to find for the average rate of change from n1 = 2 to n2 = 4, we simply have to use the formula:

average rate of change = (value2 – value1) / (n2 – n1)

Substituting:

average rate of change = (- 10.125 – (-3.5)) / (4 – 2)

average rate of change = (- 6.625) / (2)

average rate of change = -3.3125

Therefore the average rate of change from n=2 to n=4 is -3.3125.

Answer:

B or −3.3125

Step-by-step explanation:

flex point 2023

The car gets 20 miles per gallon.

To find the miles per gallon the car gets, we need to divide the total miles driven by the number of gallons of gas used. In this case, the car goes 332 miles on a single tank, and the gas tank holds 16.6 gallons. So, the miles per gallon can be calculated as:

Miles per gallon = Total miles driven / Number of gallons used

Miles per gallon = 332 miles / 16.6 gallons

Miles per gallon = 20 miles

Therefore, the car gets 20 miles per gallon.

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A circle is a curve sketched out by a point moving in a plane. The radius of the given circle is 8.4 units. The correct option is D.

A circle is a curve sketched out by a point moving in a plane so that its distance from a given point is constant; alternatively, it is the shape formed by all points in a plane that are at a set distance from a given point, the centre.

In a circle, a tangent is always perpendicular to the radius of the circle. Therefore, in the given figure the triangle formed will be a right angled triangle.

Now, in a right angle triangle, using the Pythagoras theorem the relation between the different sides of the triangle can be written as,

AO² = AB² + OB²

(9.8)² = 5² + r²

96.04 = 25 + r²

r² = 96.04 - 25

r² = 71.04

r = √(71.04)

r = 8.4

Hence, the radius of the given circle is 8.4 units.

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Recognizing the specific forms of square trinomials and the difference of squares allows you to rewrite them as separate factors, simplifying algebraic expressions and facilitating further mathematical operations.

Knowing when to rewrite square trinomials and the difference of squares as separate factors depends on the algebraic expression you are dealing with. Let's consider each case separately.

1. Square Trinomials:

  - Square trinomials have the form [tex]\(a^2 + 2ab + b^2\) or \(a^2 - 2ab + b^2\)[/tex], where(a) and (b) are algebraic expressions.

  - These trinomials can be factored into the square of a binomial: [tex]\((a + b)^2\) or \((a - b)^2\).[/tex]

  - You should rewrite a square trinomial as separate factors when you encounter an expression that matches the form of a perfect square trinomial. Recognizing this pattern allows you to simplify the expression.

2. Difference of Squares:

  - The difference of squares has the form [tex]\(a^2 - b^2\),[/tex] where (a) and (b) are algebraic expressions.

  - This expression can be factored into the product of conjugates: [tex]\((a + b)(a - b)\).[/tex]

  - You should rewrite a difference of squares as separate factors when you have an expression in the form [tex]\(a^2 - b^2\)[/tex]. Recognizing this pattern helps you simplify and factor the expression efficiently.

Answer:  The correct option is (A) 25.

Step-by-step explanation:  We are given to find the value of x from the figure shown.

From the figure, we note that there are two parallel lines and a transversal.

Also, the angles with measurements (x + 40)° and (3x - 10)° are corresponding angles.

Since the measures of two corresponding angles are equal, so we must have

[tex](x+40)^\circ=(3x-10)^\circ\\\\\Rightarrow x+40=3x-10\\\\\Rightarrow 3x-x=40+10\\\\\Rightarrow 2x=50\\\\\Rightarrow x=\dfrac{50}{2}\\\\\Rightarrow x=25.[/tex]

Thus, the required value of x is 25.

Option (A) is CORRECT.

The statement x + 6 = 6 + x demonstrates the symmetric property of equality.

The given statement x + 6 = 6 + x represents the symmetric property.

The symmetric property of equality states that if a = b, then b = a. In this case, both sides of the equation are the same, with x and 6 appearing in different orders. Thus, the equation satisfies the symmetric property.

For example, if we let x = 2, the equation becomes 2 + 6 = 6 + 2, which is true.

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Answer: The value of b is approximately 54.94 .

Explanation:

In the given figure two angles are given and according to the angle sum property the sum of interior angles of a triangle is 180 degree.

[tex]\angle A+\angle B+\angle C=180[/tex]

[tex]42+\angle B+41.5=180[/tex]

[tex]\angle B=180-83.5[/tex]

[tex]\angle B=96.5[/tex]

According to the law of sine,

[tex]\frac{a}{\sin A} =\frac{b}{\sin B} =\frac{c}{\sin C}[/tex]

From given figure, [tex]\angle A=42,a=37[/tex]

[tex]\frac{37}{\sin (42^{\circ})}= \frac{b}{\sin (96.5^{\circ})}[/tex]

[tex]\frac{37}{0,66913} =\frac{b}{0.99357}[/tex]

[tex]b=54.94018[/tex]

[tex]b\approx 54.94[/tex]

Therefore, the value of b is 54.94.

Answer:

The correct answer is 4/13

Step-by-step explanation:

The events "drawing a diamond or a seven" are inclusive events since there is a seven of diamonds. Follow the rule for inclusive events.

P(A ∪ B) = P(A) + P(B) − P(A ∩ B)

Hope this helps! :)

The normal line to the parabola [tex]y=x-x^2[/tex] at the point [tex](1,0)[/tex] intersect it second time at the point [tex](-1,-2)[/tex].

The given equation is:

at point,

then,

→ [tex]y' = 1-2x[/tex]

So, at (1,0),

→ [tex]y' = 1-2\times 1[/tex]

      [tex]= -1[/tex]

Since,

This is the slope of the tangent, we take its negative reciprocal to get the slope of normal:

= [tex]-\frac{1}{(-1)}[/tex]

= [tex]1[/tex]

The normal line has slope 1 and goes through (1,0):

→ [tex]y-0=1(x-1)[/tex]

→       [tex]y = x-1[/tex]

We want to know where this intersects [tex]y = x-x^2[/tex], we get

→ [tex]x-1=x-x^2[/tex]

→ [tex]x^2=1[/tex]

→ [tex]x = \pm 1[/tex]

hence,

The point corresponding to (1,0) is the one we started with, so we want x=-1:  

→ [tex]x = -1[/tex]

→ [tex]y = x-x^2[/tex]

By substituting the value of "x", we get

→    [tex]= -1-1[/tex]

→    [tex]= -1[/tex]

Thus the answer above is right.

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Answer: Solution is,

d. (2, 0)

Step-by-step explanation:

Since, the equation of line that passes through points [tex](x_1,y_1)[/tex] and [tex](x_2,y_2)[/tex] is,

[tex](y-y_1)=\frac{x_2-x_1}{y_2-y_1}(y-y_1)[/tex]

Thus, the equation of line through the points (3, 1) and (–5, –7) is,

[tex](y-1)=\frac{-7-1}{-5-3}(x-3)[/tex]

[tex](y-1)=\frac{-8}{-8}(x-3)[/tex]

[tex]y - 1 = x - 3[/tex]

[tex]\implies y = x - 2------(1)[/tex],

Equation of second line is,

[tex]y = 0.5x - 1 -----(2)[/tex],

By equation (1) and (2),

x - 2 = 0.5x - 1 ⇒ 0.5x = 1 ⇒ x = 2,

From equation (1),

We get, y = 0,

Hence, the solution of line (1) and (2) is (2,0).

Answer:

2

Step-by-step explanation:

this is right trust

Answer: 2x = 14

Step-by-step explanation:

Solving the equation us in elimination method,

x + y - 6 = 0...1

x - y - 8 = 0...2

From 1,

x+y = 6...3

x-y = 8...4

To eliminate y, we will add equation 3 and 4 since both the signs attached to y are different.

2x=6+8

2x = 14 (This will be the resulting equation)

To get the variables x, we will divide both sides of the resulting equation by 2

x = 14/2

x = 7

Substituting x = 7 into eqn 3

7 + y = 6

y = -1

Final answer:

A parabola in the first quadrant opening upwards implies a positive 'a' value and a discriminant that, if not negative, yields real roots with positive values.

Explanation:

When a parabola has its vertex in the first quadrant and it opens upwards, we can determine specific values for a and the discriminant. The coefficient 'a' in the quadratic equation ax²+bx+c = 0 must be positive for the parabola to open upwards. Concerning the discriminant (calculated as b²-4ac), if the vertex is in the first quadrant, the parabola either does not intersect the x-axis at all (discriminant < 0), or it intersects the x-axis at one point (discriminant = 0) or two points (discriminant > 0) that both have positive x values.

The discriminant plays a key role in determining the nature of the roots of the quadratic equation. For quadratic equations constructed on physical data, they usually have real roots. Practical applications often deem the positive roots significant.