Since equal weights of the two mixes are combined, you can imagine using any convenient equal weights, like 80 units each. Pick a number that is a common multiple of the denominators of the fruit fractions you found.

Find how many units of fruit come from each mix at your chosen weight, add them, and then divide this total fruit weight by the total weight of both mixes together to get the fraction that is fruit.

In Desmos, enter 3/10 and 5/16 to verify the fractions of fruit for mixes P and Q (you can compare their decimal values if that helps your intuition).

In Desmos, type the expression (3/10*80 + 5/16*80)/160. The calculator’s output is the fraction of the total weight of mix R that is dried fruit; compare this value to the answer choices.

For each mix, the ratio is given as fruit : grains.

• Mix P has ratio $3:7$. That means there are $3+7=10$ total parts, and 3 of them are fruit, so the fraction of fruit is $\dfrac{3}{10}$.
• Mix Q has ratio $5:11$. That means there are $5+11=16$ total parts, and 5 of them are fruit, so the fraction of fruit is $\dfrac{5}{16}$.

Because equal weights of mixes P and Q are combined, you can choose any convenient same weight for each mix. Pick 80 units for each mix because 80 is a common multiple of 10 and 16, which keeps everything in whole numbers.

Compute how much fruit comes from each 80-unit batch.

So, total fruit in mix R is $24+25 = 49$ units.

Total weight of mix R is $80+80 = 160$ units.

Now form the fraction

So the correct answer is $\dfrac{49}{160}$, which corresponds to choice D.