The length of the missing diagonal is 4 miles.
Step-by-step explanation:
GIVEN :
Area of rhombus = 20 square milesDiagonals of rhombus = 10 milesTO FIND :
Length of missing diagonalsUSING FORMULA :
[tex] \longrightarrow{\sf{Area \: of \: rhombus = \dfrac{d_1 \times d_2}{3}}}[/tex]
SOLUTION :
Substituting the given values in the formula to find the length of the missing diagonal :
[tex] \longrightarrow{\sf{Area \: of \: rhombus = \dfrac{d_1 \times d_2}{3}}}[/tex]
[tex] \longrightarrow{\sf{20 = \dfrac{10 \times d_2}{2}}}[/tex]
[tex] \longrightarrow{\sf{20 \times 2= 10 \times d_2}}[/tex]
[tex] \longrightarrow{\sf{40= 10 \times d_2}}[/tex]
[tex] \longrightarrow{\sf{d_2 = \dfrac{40}{10}}}[/tex]
[tex] \longrightarrow{\sf{d_2 = \cancel{\dfrac{40}{10}}}}[/tex]
[tex]\longrightarrow{\sf{\underline{\underline{d_2 = 4 \: miles}}}}[/tex]
Hence, the length of the missing diagonal is 4 miles.
Answer:
The length of the missing diagonal is 4 miles.
Step-by-step explanation:
To find the length of the missing diagonal, we can use the formula for the area of a rhombus, which is:
[tex]\sf\qquad\dashrightarrow Area_{(Rhombus)} = \dfrac{(Diagonal_1 \times Diagonal_2)}{2}[/tex]
We know that the area is 20 square miles and one of the diagonals is 10 miles, so we can substitute these values into the formula as follows:
[tex]\sf\qquad\dashrightarrow20 = \dfrac{(10 \times Diagonal_2)}{2}[/tex]
Simplifying the equation, we get:
[tex]\sf\qquad\dashrightarrow 40 = 10 \times Diagonal_2[/tex]
Dividing both sides by 10, we get:
[tex]\sf\qquad\dashrightarrow \boxed{\bold{\:\:Diagonal_2 = 4\:\:}}\:\:\:\bigstar[/tex]
Therefore, the length of the missing diagonal is 4 miles.
HELP!!!!!!!!!!!!!!!!!
What did I do wrong on 6,7, and 8??
Once there is an answer… Please no one else answer!
The transformation in words for picture 6 is a rotation of 90° counterclockwise or 90° counterclockwise rotation.
The algebraic rule for the above transformation is (x, y) → (-y, x).
The transformation in words for picture 7 is a reflection across the line x = -3.
The algebraic rule for the above transformation is [tex]Ref_{x=-3} \triangle ABC[/tex].
The transformation in words for picture 8 is a reflection across the x-axis.
The algebraic rule for the above transformation is (x, y) → (x, -y).
What is a rotation?In Mathematics and Geometry, the rotation of a point 90° about the center (origin) in a counterclockwise (anticlockwise) direction would produce a point that has these coordinates (-y, x).
By applying a rotation of 90° counterclockwise to the vertices of quadrilateral RSTUVW, the coordinates of W of the image is as follows:
(x, y) → (-y, x)
Ordered pair W = (-1, 3) → Ordered pair R' = (-(3), -1) = (-3, -1).
What is a reflection?In Mathematics and Geometry, a reflection over the x-axis is modeled by this transformation rule (x, y) → (x, -y). Therefore, a reflection over the x-axis would maintain the same x-coordinate while the sign of the x-coordinate changes from positive to negative or negative to positive.
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An American football field is 120 yards long, including the end zones. How long is that in inches?
The length of an American football field including end zones is 21600 inches.
How many inches is a 120-yard football field?To convert yards to inches, we multiply by 36, since there are 36 inches in one yard.
Therefore, a football field that is 120 yards long is equivalent to 120 x 36: = 4320 feet. To convert feet to inches, we multiply by 12, since there are 12 inches in one foot.
Therefore, a 120-yard football field is equivalent to 4320 x 12 = 51,840 inches. However, we must also take into account the two end zones, which are each 10 yards long, or 360 inches. Thus, the total length of an American football field including the end zones is 120 x 36 x 12 + 2 x 360 = 21,600 inches.
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5 pts
It's time to remodel your home! You'd like to replace the tile in your kitchen. The room is 12'x20' with
8' ceilings. The tile costs $4.75 per square foot. How much will it cost?
If the room is 12'x20' with 8' ceilings and the tile costs $4.75 per square foot, the total cost is $1140.
To calculate the cost of replacing the tile in the kitchen, we need to first calculate the total area of the floor.
Area of the floor = Length x Width = 12 ft x 20 ft = 240 sq ft
Since we know the cost per square foot of tile, we can now multiply the total area of the floor by the cost per square foot to find the total cost:
Total cost = Area of the floor x Cost per square foot
Total cost = 240 sq ft x $4.75/sq ft
Total cost = $1140
Therefore, it will cost $1140 to replace the tile in the kitchen, assuming there are no additional costs such as labor or materials for removing the old tile.
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Is this quadrilateral a parallelogram?
Answer:
Yes it is a parallelogram because opposite sides of this quadrilateral are equal.
Which equations represent circles that have a diameter of 12 units and a center that lies on the y-axis? Select two options. x2 + (y – 3)2 = 36 x2 + (y – 5)2 = 6 (x – 4)² + y² = 36 (x + 6)² + y² = 144 x2 + (y + 8)2 = 36
The correct option are - A. x² + (y – 3)² = 36 and E. x² + (y + 8)² = 36 , for the equation of circle.
Explain about the equation of circle:The standard form equation for just a circle, which is (x - s)² + (y - t)² = r², is used to formulate our equation if we assume a generic centre point like (s,t)and r is the radius of circle.
By simply expanding basic binomial squares in their regular form and merging like words, circles can likewise be presented in expanded form.
Now for the given data:
Diameter of circle = 12 unitsRadius r = 12/2 = 6 unitscentre lies on the y axis, (s,t) = (0,t)Put the values in the standard form of the circle:
(x - s)² + (y - t)² = r²,
(x - 0)² + (y - t)² = 6²,
x² + (y - t)² = 36
Where 't' can be any integer.
Thus, the options that satisfy the stated conditions are-
A. x² + (y – 3)² = 36 : here t = 3
and E. x² + (y + 8)² = 36 ; here t = - 8.
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Correct question:
Which equations represent circles that have a diameter of 12 units and a center that lies on the y-axis?
Select two options.
A. x² + (y – 3)² = 36
B. x² + (y – 5)² = 6
C. (x – 4)² + y² = 36
D. (x + 6)² + y² = 144
E. x² + (y + 8)² = 36
Which is true about the relationship between 1 inch and 1 foot? A. 1 inch is 12 times as long as 1 foot. B. 1 foot is 12 times as long as 1 inch. C. 1 foot is 6 times as long as 1 inch. D. 1 inch is 6 times as long as 1 foot.
The true-relationship between 1 inch and 1 foot is (b) 1 foot is 12 times as long as 1 inch.
An "inch" is a unit to measure length and is equal to 1/12th of a foot. It is denoted by symbol "in"
A "foot" is a unit which measures the length and is equal to 12 inches. It is denoted as "ft" .
In the imperial system, the unit of length is the foot, and it is divided into 12 smaller units called inches,
So, 1 foot is equal to 12 inches, and we can write this as : 1 foot = 12 inches,
We rearrange this equation to get the relationship between 1 inch and 1 foot,
⇒ 1 inch = 1/12 foot,
This means that 1 inch is equal to one-twelfth of a foot. In other words, it takes 12 inches to make 1 foot.
Therefore, the correct option is (b).
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Find the slope of the line that contains these points.
(1, -3) (2, -5)
use slope equation -5 - (-3)/(2-1) then solve
Suppose Thom’s route from his house to school consists of two straight legs: First, he drives straight for 6 miles, then he makes a right turn of 60 degrees and drives another 8 miles. How far (as the crow flies) is Thom’s school from his house?
The direct distance between Thom's house and his school, as the crow flies, is 7.21 miles.
How do you calculate direct distance?To find the direct distance between Thom's house and his school, we can use the Law of Cosines.
The Law of Cosines is a formula used to find the length of one side of a triangle when the lengths of the other two sides and the angle between them are known. In this case, we have a triangle with sides of length 6 miles, 8 miles, and the angle between them is 60 degrees.
The Law of Cosines formula is:
c² = a² + b² - 2ab * cos(C)
where:
a and b are the lengths of the known sides of the triangle
C is the angle between those two sides
c is the length of the unknown side (the distance we want to find)
In this case:
a = 6 miles
b = 8 miles
C = 60 degrees
First, convert the angle from degrees to radians:
C (radians) = (60 degrees * π) / 180 = 1.047 radians
Now, apply the Law of Cosines:
c² = 6² + 8² - 2 x 6 x 8 x cos(1.047)
c² = 36 + 64 - 96 x cos(1.047)
c² ≈ 36 + 64 - 96 x 0.5
c² ≈ 36 + 64 - 48
c² = 52
Finally, find the square root to get the distance:
c = √52 = 7.21 miles
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Marta tiene un terreno de forma triangular cuya área es menor a 40 m¨2. La altura de su terreno triangular mide 2 metros más que su base.
Para esta situación, ¿Cuál de las siguientes afirmaciones es correcta? Escoge 1 respuesta:
a) La altura del terreno puede medir entre 2 metros y 10 metros.
b) El menor valor que puede tomar la base del terreno triangular es 2 metros.
c) La base del terreno triangular se encuentra entre 3 metros y 8 metros.
d) El mayor valor entero que puede tomar la altura del terreno es 8 metros.
The correct statement is option a) The height of the terrain can measure between 2 meters and 10 meters.
How to determine triangular terrain?Let the base of the triangular piece of land be x meters. Then, the height of the triangular plot is (x+2) meters.
The area of a triangle is given by the formula: A = (1/2)bh, where b is the base and h is the height.
Substituting the given values:
A = (1/2)x(x+2)
Simplifying:
A = (1/2)(x² + 2x)
Since the area is less than 40 m², write:
(1/2)(x² + 2x) < 40
Multiplying both sides by 2:
x² + 2x < 80
Rearranging and factorizing:
x² + 2x - 80 < 0
(x+10)(x-8) < 0
The roots of the quadratic equation are -10 and 8. Since the coefficient of x² is positive, the parabola opens upwards and is negative in between the roots. Therefore, the inequality is true when -10 < x < 8.
However, x cannot be negative, so the base of the triangular terrain is between 0 and 8 meters.
Substituting the values in the expression for the height, the height is between 2 and 10 meters.
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Make x the subject of y=3+2^x+1
Answer:
y=3+2 to the power of x +1
Step-by-step explanation:
Factor Special Polynomials:
Factor each of the following expressions, please
Answer:
2) [tex](3x+2)^{2}[/tex]
3) [tex](2x+5)(2x-5)[/tex]
4) [tex](x^{2} +8)(x^{2} -8)[/tex]
Step-by-step explanation:
A method I was taught was the snowflake method whenever there were numbers in front of [tex]x^{2}[/tex] (ex [tex]4x^{2} and 9x^{2}[/tex]) picture shown below (you can search up some videos if you would like)
The snowflake method is really efficient and helps factor polynomials faster
For 3 and 4, you basically have to find the square root of the number without the [tex]x^{2}[/tex] and make sure (for example 25) one parenthesis had -5 and the other had +5. Number 4 had [tex]x^{4}[/tex], [tex]x^{2}*x^{2}[/tex] is [tex]x^{4}[/tex] so you would include that in the equation. To double check, use foil.
The committee spends $462 on costumes for 24 people. Each costume costs the same amount of money.
How much did each costume cost, in dollars?
Answer:
Step-by-step explanation: 462 Divided by 24 = 19.25$
Proof: 19.25 x 24 = 462
Answer: 19.25$
find the truth set of *-1/2 《 5/2 + 2
The truth set of the inequality is all values of x greater than -9. In interval notation, this can be written as (-9, ∞)
How to Solve the Inequality?Multiply both sides by -2 (and reversing the direction of the inequality because we are multiplying by a negative number) gives:
x > -2*(5/2 + 2)
x > -5 - 4
x > -9
Therefore, the truth set of the inequality is all values of x greater than -9. In interval notation, this can be written as:
(-9, ∞)
Below is the complete question:
Find the truth set of x*(-1/2) < 5/2 + 2
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simplify the following equation
Answer:
the required answer is √5-√6
Jenny mixed 4 kg of mixed nuts containing 16% peanuts with 12 kg of mixed nuts containing 40% peanuts. What percent of the new mixture if peanuts?
A. 34%
B. 17%
C. 13%
The new mixture contains 34% peanuts.
How to calculate percent of the new mixture if peanutsUsing a weighted average approach.
Let x be the percentage of peanuts in the new mixture. Then we can set up the following equation:
(0.16)(4) + (0.40)(12) = x(4 + 12)
simplifying the equation, we get:
0.64 + 4.8 = 16x
5.44 = 16x
x = 0.34 or 34%
Therefore, the new mixture contains 34% peanuts.
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PLSSS HELPP
This figure represents the base of a fish tank that is 8 inches high.
What is the volume of the fish tank?
Responses
378 in³
378 in³
408 in³
408 in³
480 in³
480 in³
768 in³
The volume of the fish tank is 408in³
What is volume?Volume is defined as the space occupied within the boundaries of an object in three-dimensional space. It is also known as the capacity of the object.
The volume of regular object is given as;
V = base area × height
base area = 13 × 6
= 78in²
The area of the cut out section = 1/2(a+b) h
= 1/2 × (3+6) × 6
= 9× 3 = 27in²
The actual area of the base shown = 78-27
= 51 in²
therefore the volume of the tank will be
V = 51 × 8
= 408in³
therefore the volume of the tank is 408in³
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A light source at a height of 8 metres is shining a laser beam onto the mirror on the ground. The light beam needs to be observed by a sensor at a height of 4 metres. If the total distance the laser beam travels is 15 metres, what is the distance between the bases of the light source and the sensor? Your answer should be a numerical value.
Consider the following random sample of diameter measurements (in inches) of 14 softballs.
4.75, 4.71, 4.78, 4.81, 4.69, 4.89, 4.68, 4.86, 4.84, 4.86, 4.75, 4.72, 4.71, 4.69
Send data to calculator Send data to Excel
If we assume that the diameter measurements are normally distributed, find a 99% confidence interval for
the mean diameter of a softball. Give the lower limit and upper limit of the 99% confidence interval.
Step-by-step explanation:
sadly, we have only 14 data points. that is a very small sample to find a more or less reliable standard deviation for the production of softballs.
because to create the desired answer we need to calculate the mean value and the standard deviation. and we need to mix that with the Z- value of the standard normal distribution table representing the 99% confidence (= coverage of 99% of the area under the normal distribution curve, meaning therefore from 99.5% to 0.5%).
the confidence interval limits are
mean ± Z×sd/sqrt(n)
mean = mean value of the sample.
sd = standard deviation (either of - preferred - the entire population or of the sample)
n = number of data points (here 14).
Z = Z value of the standard normal distributing table for 99% (2.576).
here a little table for different confidence intervals :
Confidence Interval Z
80% 1.282
85% 1.440
90% 1.645
95% 1.960
99% 2.576
99.5% 2.807
99.9% 3.291
mean value = sum of all data points divided by the number of data points :
mean = 66.74/14 = 4.767142857...
sd = sqrt(sum((data point difference to mean)²)/n)
let's use some calculation tool like Excel (after all, the mean value is not a simple number, and to write this all up here takes a lot of space).
sd = 0.069941667...
the confidence interval limits are then
4.767142857... ± 2.576×0.069941667.../sqrt(14) =
= 4.767142857... ± 0.048152387...
upper limit = 4.815295244 ... ≈ 4.82
lower limit = 4.71899047 ... ≈ 4.72
that means, we are 99% sure that the true mean value across all produced softballs is between these 2 limits.
in other words, for 99% of such samples we can pick, their mean values will be between these 2 limits. and 1 % of such samples we expect to have a mean value outside of these 2 limits.
Is anyone good at “describe linear and nonlinear function” please help ASAP!
Answer:
A
If u plug it into desmos u get a straight line
find the values of variables, then find the lengths of the sides of each quadrilateral
The variables are as follows:
x = 4
y = 4.8
The lengths of the sides of the kites are 4.5 and 6.8 units.
How to find the side of a kite?A kite is a quadrilateral with 2 pairs of consecutive congruent sides. The diagonals are perpendicular in a kite.
The non vertex angles are congruent.
Therefore,
x + 0.5 = 2x - 3.5
2x - x = 0.5 + 3.5
x = 4
y + 2 = 2y - 2.8
2y - y = 2 + 2.8
y = 4.8
Hence,
length of one pair = 4 + 0.5 = 4.5 units
length of the other pair = 4.8 + 2 = 6.8 units
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Chairs need to be set up for the audience members. You want to use. the fewest number of chairs and still meet these three additional condions.
• There are 23 rows of chairs.
• There are the same number of chairs in esch row.
• There are an even number of chairs in cads rom.
Based on the number of students expected to attend, design a plan to set up the chairs. State how many total chairs there are, and explain why your plan meets these conditions.
There must be 46 chairs in each row and total number of chairs are 1058
To meet the given conditions, we need to find a number that has the following properties:
It should be divisible by 2, as there are an even number of chairs in each row.
It should be divisible by 23, as there are 23 rows of chairs.
It should be the same number in each row.
The smallest number that satisfies these conditions is 46, which is the least common multiple of 2 and 23.
So, we need to set up 46 chairs in each row.
The total number of chairs required will be:
Total number of chairs = 23 rows x 46 chairs per row = 1058 chairs
Hence, the total number of chairs are 1058
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Please help !!
i only need help with the second problem which is:
5. For 0≤x≤ 6, express g(x) in terms of x. Do not include +C in your final answer.
Your help is very appreciated !!
From the calculation, g increases on the interval [-3, 6) and for 0 ≤ x ≤ 6, g(x) = 6 - 1/2(x-2)^2.
What is the interval that g increases?To determine where g is increasing, we need to find where its derivative, g'(x), is positive. We can find g'(x) by differentiating g(x) with respect to x:
g'(x) = f(x)
Since f(x) is a piecewise-defined function, we need to consider each interval separately.
For -3 ≤ x < 0, f(x) = 3, so g'(x) = 3, which is positive.For 0 ≤ x ≤ 6, f(x) = -x + 3, which is a decreasing function, so g'(x) is also decreasing. However, since f(x) is always non-negative on this interval, g'(x) is non-negative as well.For 6 < x ≤ 9, f(x) = -3, so g'(x) = -3, which is negative.Therefore, g is increasing on the interval [-3, 6).
To justify this, note that g'(x) = 0 at x = 0 and x = 6, where g has local maxima. This means that g is increasing on the intervals (-3, 0) and (0, 6) and decreasing on (6, 9]. Since g is continuous, it cannot have any jumps, so it must be increasing or decreasing on each of these intervals. Since g(-3) = 0 and g(6) = 9, we know that g is increasing on the interval [-3, 6).
We can evaluate g(x) on the interval [0, 6] by integrating f(x) with respect to t from -2 to x:
g(x) = ∫_{-2}^{x} f(t) dt
On the interval [-3, 0), f(t) = 3, so we have:
g(x) = ∫_{-2}^{0} 3 dt + ∫_{0}^{x} (-t + 3) dt
Simplifying the integrals, we get:
g(x) = 6 - 1/2(x-2)^2, for 0 ≤ x ≤ 6
(Note that we can drop the "+C" since it's being evaluated at the limits of integration.)
Therefore, for 0 ≤ x ≤ 6, g(x) = 6 - 1/2(x-2)^2.
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jenny earned a 77 on her most resent test. jennys score is no less than 5 points greater than 4/5 of terrance score if t represents terrances score which is the inequality represents the sisuation.
Answer: Jenny's score is no less than 5 points greater than 4/5 of Terrance's score.
Step-by-step explanation:
The inequality that represents the situation described is:
Jenny's score (denoted as "J") is no less than 5 points greater than 4/5 of Terrance's score (denoted as "T"):
J ≥ (4/5)T + 5
In this inequality, we are saying that Jenny's score "J" must be greater than or equal to 4/5 of Terrance's score "T", plus an additional 5 points. This reflects the condition that Jenny's score should be at least 5 points higher than 4/5 of Terrance's score.
For example, if Terrance's score "T" is 80, then 4/5 of Terrance's score is (4/5) * 80 = 64. Adding 5 points to this gives us 69. Therefore, Jenny's score "J" must be greater than or equal to 69 in this case, since it should be no less than 5 points greater than 4/5 of Terrance's score.
I really need help with this to find x value and need reasons
Answer:
x = 45 degrees
Step-by-step explanation:
All angles in a triangle will add up to 180 degrees. So far we have 57 degree of 180. We also see a supplementary angle, with one side being 102 degrees, so the other is 78 degrees, because it must add up to 180. We see that the arrows in the bases show that the corners are even, so now we know two corners: one with 57 degrees and the other with 78.
Now, follow this equation to find x:
57 + 78 + x = 180
135 + x = 180
-135 -135
x = 45
PLEASE RESPOND FAST I NEED IT ANSWERED
The data set lists the ages of the cast members of a recent children’s play. Find the median age. {14, 11, 8, 12, 5, 3, 17, 10, 8, 11}
Answer:
Mean: 9.9
Median: 10.5
Step-by-step explanation:
Gabriella is 53 5/6
inches tall. Sheila is 1 1/3
inches shorter than Gabriella and Jane is 1 1/4
inches shorter than Sheila. How tall is Jane?
The graph of f(x)=x2 was transformed to create the graph of g(x)=−f(x−1)+2 Which is the graph of g ?
01. Resuelve: (4x² + 8x +12) + (5x² − 3x + 6) =
02. Evalúa: 5-21 + (-3) (2) =
03. Evalúa la expresión: (-3) (-2) (-1) (4) =
04. 18+ 3x = 27, el valor de x es:
05. Evalúa: 3² + 4 (3)² =
1. Por lo tanto, la suma de las dos expresiones es 9x² + 5x + 18.
2. Por lo tanto, el resultado de la expresión es -22.
3. Por lo tanto, el resultado de la expresión es 24.
4. Por lo tanto, el valor de x es 3.
5. Por lo tanto, el resultado de la expresión es 45.
¿Cuál es la expresión?1. Para sumar las dos expresiones, simplemente sumamos los términos semejantes:
(4x² + 8x +12) + (5x² − 3x + 6) = 9x² + 5x + 18
Por lo tanto, la suma de las dos expresiones es 9x² + 5x + 18.
2. Evaluando la expresión numérica:
5 - 21 + (-3) (2) = 5 - 21 + (-6)
Luego, sumamos los términos:
= -16 - 6 = -22
Por lo tanto, el resultado de la expresión es -22.
3. Evaluando la expresión numérica:
(-3) (-2) (-1) (4) = 24
Por lo tanto, el resultado de la expresión es 24.
4. Para encontrar el valor de x, debemos despejarlo de la ecuación:
18 + 3x = 27
Restando 18 de ambos lados, obtenemos:
3x = 9
Dividiendo ambos lados por 3, obtenemos:
x = 3
Por lo tanto, el valor de x es 3.
5. Evaluando la expresión numérica:
3² + 4 (3)² = 3² + 4 (9)
Primero elevamos al cuadrado 3, luego multiplicamos 4 por 9 y sumamos ambos términos:
= 9 + 36
Por lo tanto, el resultado de la expresión es 45.
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Identify the line that appears tangent to circle O and includes point B.
Answer:
D. Line O
Step-by-step explanation:
We can simply tell which one it is by looking at the picture. A tangent line is a line that intersects at one point only. Line L doesn't even touch the circle. Line M and N touch the circle in more than one place. If we look at O, we can see that it is "scraping" the edge of the circle, which is what pretty much every tangent line looks like.
Therefore, the answer is D.
What is the value of the expression −38 − 16 − (−23)?
Answer:
-31
Step-by-step explanation: