Answer: The weight of X is [tex]33\dfrac{1}{3}\%[/tex] of weight of mixture.
Step-by-step explanation:
Since we have given that
Percentage of seed mixture X for ryegrass = 40%
Percentage of seed mixture Y for ryegrass = 25%
If a mixture of X and Y contains 30 percent ryegrass,
Let total seed mixture be 100
So, for seed X = x
For seed Y = 100-x
So, According to question,
[tex]0.4x+0.25(100-x)=30\\\\0.4x+25-0.25x=30\\\\0.15x=30-25\\\\0.15x=5\\\\x=\dfrac{5}{0.15}\\\\x=\dfrac{100}{3}[/tex]
So, weight of mixture X is given by
[tex]\dfrac{\text{Weight of X}}{\text{Weight of mixture}}\times 100\\\\=\dfrac{\dfrac{100}{3}}{100}\times 100\\\\=\dfrac{100}{3}\%\\\\=33\dfrac{1}{3}\%[/tex]
Hence, the weight of X is [tex]33\dfrac{1}{3}\%[/tex] of weight of mixture.
