Answer:
z = 188
Step-by-step explanation:
1. 10/13 = 8 - 2z/52 (simplify - 2z/52)
10/13 = 8 (- 1/26)*z
2. 10/13 = (- 1/26)*z + 8 (flip for ease in solving)
(- 1/26)*z + 8 = 10/13
3. (- 1/26)*z + 8 = 10/13 (inverse: subtract 8 from each side to isolate variable <em>z</em>)
(- 1/26)*z = 10/13 - (8*13)/(1*13) (common denominator needed for add/subtract)
(- 1/26)*z = - 94/13 (simplify)
4. (- 1/26)*z = - 94/13 (inverse: multiply both sides by -26/1 to isolate variable <em>z</em>)
<h2>z = 188</h2>
Step-by-step explanation:
dy/dx
= d/dx [x / (1 - x²)]
= [(1 - x²)(1) - (x)(-2x)] / (1 - x²)²
= (1 + x²) / (1 - x²)².
When dy/dx = 1, (1 + x²) / (1 - x²)² = 1.
=> 1 + x² = 1 - x²
=> 2x² = 0, x = 0.
Also when x = 0, y = (0) / [1 - (0)²] = 0.
Hence the coodinates is (0, 0).
Answer:
No,the number isn't a perfect square
Step-by-step explanation:
Taking the prime factor of the number, each factor can be raised to the power of 2 except 3
Answer:
+ 8b + 11 + 6x + 5c
Step-by-step explanation:
1.1 Split 8b + 11 + 6x + 5c
into two 2-term polynomials
+ 11 + 8b and + 6x + 5c
This partition did not result in a factorization. We'll try another one:
8b + 11 and + 6x + 5c
This partition did not result in a factorization. We'll try another one:
8b + 6x and + 11 + 5c
This partition did not result in a factorization. We'll try another one:
8b + 5c and + 6x + 11
This partition did not result in a factorization. We'll try another one:
+ 5c + 8b and + 6x + 11
This partition did not result in a factorization. We'll try another one:
+ 6x + 8b and + 11 + 5c
All three partitions failed. Tiger finds no factorization
Given the equation;
To solve, let us multiply through by the least common multiple of the the denominator of the three fractions wich is 24;
