Question
What is the difference between the number of Junior and
Senior employees in the IT division? Direction: A tech company has employees working across five divisions: Engineering, Sales, HR, IT, and Customer Support. Employees in each division are categorized into three experience levels: Junior, Mid-Level, and Senior. The total number of employees is 800. The following information is provided about the distribution of employees: The Engineering division has 25% of the total employees, with Junior, Mid-Level, and Senior employees in the ratio 2:1:2. The Sales division comprises 20% of the company's workforce, with Junior employees making up 50%, Mid-Level employees 30%, and the rest Senior employees. The HR division has 15% of the total employees, distributed in the ratio of 1:2:3 for Junior, Mid-Level, and Senior employees, respectively. The IT division has 30% of the employees, distributed among Junior, Mid-Level, and Senior levels in the ratio 4:5:6. The Customer Support division includes the remaining employees, with 40% Junior, 40% Mid-Level, and 20% Senior employees. Answer the following questions based on the above data:Solution
Total employees in IT = 30% of 800 = 240 Junior employees = (4/15) * 240 = 64 Senior employees = (6/15) * 240 = 96 Difference = 96 - 64 = 32
I. 4p² + 17p + 15 = 0
II. 3q² + 19q + 28 = 0
I:Â x2Â - 33x + 242 = 0
II:Â y2Â - 4y - 77 = 0
I. x² - 208 = 233
II. y² + 47 - 371 = 0
I. 2b2 - 37b + 143 = 0
II. 2a2 + 15a - 143 = 0
Solve the quadratic equations and determine the relation between x and y:
Equation 1: x² - 45x + 450 = 0
Equation 2: y² - 48y + 540 = 0�...
I). p2 + 22p + 72 = 0,
II). q2 - 24q + 128 = 0
I. √(74x-250 )– x=15
II. √(3y²-37y+18)+ 2y=18
I. 3y² - 20y + 25 = 0
II. 3x² - 8x + 5 = 0
I. 2y2 - 15y + 18 = 0
II. 2x2 + 9x - 18 = 0
Solve the quadratic equations and determine the relation between x and y:
Equation 1: 103x² - 470x + 367 = 0
Equation 2: 107y² - 504y + 397 = 0
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