4r + 9 + r+ 2p - 3
CHOICES:
5r + 2p + 6
7r + 6
14r - p
5r + 2p - 12
Answer:
5r + 2p + 6
Step-by-step explanation:
4r+r = 5r
9-3 = 6
y = x – 5
Which description best describes the solution to the system of equations? (4 points)
Lines y = –2x + 3 and y = 3x - 5 intersect the x-axis.
Line y = –2x + 3 intersects line y = x – 5.
Lines y = –2x + 3 and y = 3x – 5 intersect the y-axis.
Line y = –2x + 3 intersects the origin.
The answer above/below is incorrect!!!!!!!!!!!!!! I just took the test and it was wrong!!!!
is perpendicular to the x-axis,
A. Equation; x = 4
B. Equation; x = -2
C. Slope undefined
D. Slope: 0
E. Equation: y = 4
F. Equation: y = -2
Answer:a,b,e,f
Step-by-step explanation:
Answer:
Therefore, the true statement about the Six Sigma approach within an organization is option 1: To minimize the number of defects in processes.
Step-by-step explanation:
The true statement about the Six Sigma approach within an organization is: Option 1: To minimize the number of defects in processes. Six Sigma is a methodology used to improve the quality and efficiency of processes within an organization. It focuses on reducing variability and eliminating defects in order to achieve near-perfect performance. The goal of Six Sigma is to bring the number of defects or errors in a process to a level that is statistically close to zero. By using statistical analysis and data-driven methods, Six Sigma aims to identify and eliminate the root causes of defects and errors in processes. This leads to improved quality, increased customer satisfaction, and reduced costs for the organization. Options 2, 3, and 4 are not true statements about the Six Sigma approach. While Six Sigma can indirectly impact profits, reduce employee turnover, and improve marketing efforts by improving processes and customer satisfaction, these are not its primary objectives.
Answer:
Step-by-step explanation:
Using the formula for calculating the distance between two points as shown;
D = √(x2-x1)²²+(y2-y1)²
Given the coordinates (-2, 4) and (10,2)
x1 = -2, y1 = 4, x2 = 10 and y2 = 2
substitute into the formula;
D = √(10+2)²+(2-4)²
D = √(12²+(-2)²
D = √144+4
D = √148
D = 12.17 units
Hence the distance of Mac,s house from Nate's house is 12.17 units
To find the coordinates of Mac's house, we use the section formula in mathematics. By substitifying the given locations of Nate's house and the park into the formula, we conclude that Mac's house is located at approximately (2, 3.33) which is one third the distance from Nate's house to the park.
In this math problem, we are dealing with points in a 2D cartesian coordinate system. Nate's house is at (-2, 4) and the park is at (10, 2). Mac's house is located one third of the distance between these two points. Following the formula for the coordinates of a point dividing a line segment in a given ratio, we can find Mac's house location.
Let the coordinates of Mac's house be (x, y). We use the formula for section formula which is:
x = [(m*x2 + n*x1) / (m+n)] and y = [(m*y2 + n*y1) / (m+n)]
Here, x1, y1 (-2, 4) are the coordinates of Nate's house, x2, y2 (10, 2) are the coordinates of the park and the ratio m:n is 1:2 since it's one third of the distance from Nate's house to the park.
By substituting these values in the formula, we get x = [(1*10 + 2*-2) / (1+2)] = 2 and y = [(1*2 + 2*4) / (1+2)] = 3.33
So, the coordinates of Mac's house are approximately (2, 3.33).
#SPJ3
Tangent Ratio.
Find the missing side. Round to the nearest Tenth.