Answer:
A polynomial in standard form has terms arranged with the highest exponent on leftmost side and the lowest exponent on the right end. The variables are also arranged alphabetically.Step-by-step explanation:
Answer:
We can conclude that Δ GHI ≅ Δ JKL by SAS postulate.
Step-by-step explanation:
Δ GHI and Δ JKL are congruents because:
1. Their sides GH and JK are equal (9 units = 9 units)
2. Their included angles ∠G and ∠J are equal (62° = 62°)
3. Their sides GI and JL are equal (17 units = 17 units)
Now, we can conclude that Δ GHI ≅ Δ JKL by SAS postulate.
Answer:
The length of VI = 4 cm
Solution:
The plot is like a quadrilateral and the fences are built on the diagonal
We know that for quadrilateral both the diagonals are in same height,
So as per the picture, GH = FI
Now we know that GV = 6.55, FV = 5.84, VH = 3.27
Hence,
GH = FI
Rounding off:
Here the number to be round off is 3.98, 9 belongs to the first category stated above. So, 3 is increased to 4.
Hence, the length of VI = 4 cm.
Answer:
The length of VI = 4 cm Solution:The plot is like a quadrilateral and the fences are built on the diagonal We know that for quadrilateral both the diagonals are in same height, So as per the picture, GH = FINow we know that GV = 6.55, FV = 5.84, VH = 3.27Hence,GH = FI\Rightarrow GV + VH = VI + VF\Rightarrow 6.55 + 3.27 = VI + 5.84\Rightarrow VI = 6.55 + 3.27 - 5.84\Rightarrow VI = 3.98Rounding off:If the number that we are rounding is followed by 5 to 9, then the number has to be increased to the next successive number.If the number that we are rounding is followed by 1 to 4, then the number has to remain the same.Here the number to be round off is 3.98, 9 belongs to the first category stated above. So, 3 is increased to 4.Hence, the length of VI = 4 cm.
Step-by-step explanation: