# If the market price is 40 and it has already committed to paying the fixed cost what is the maximum profit for the producer?

A producer in a perfectly competitive industry has a cost function described by TC(q)=1000+6q+0. Show more A producer in a perfectly competitive industry has a cost function described by TC(q)=1000+6q+0.2q^2. If the market price is 40 and it has already committed to paying the fixed cost what is the maximum profit for the producer? A producer in a perfectly competitive industry has a cost function described by TC(q)=1000+6q+0.2q^2. If the market price is 40 and it has already committed to paying the fixed cost what is the maximum profit for the producer? A producer in a perfectly competitive industry has a cost function described by TC(q)=1000+6q+0.2q^2. If the market price is 40 and it has already committed to paying the fixed cost what is the maximum profit for the producer? A producer in a perfectly competitive industry has a cost function described by TC(q)=1000+6q+0.2q^2. If the market price is 40 and it has already committed to paying the fixed cost what is the maximum profit for the producer? A producer in a perfectly competitive industry has a cost function described by TC(q)=1000+6q+0.2q^2. If the market price is 40 and it has already committed to paying the fixed cost what is the maximum profit for the producer? A producer in a perfectly competitive industry has a cost function described by TC(q)=1000+6q+0.2q^2. If the market price is 40 and it has already committed to paying the fixed cost what is the maximum profit for the producer? A producer in a perfectly competitive industry has a cost function described by TC(q)=1000+6q+0.2q^2. If the market price is 40 and it has already committed to paying the fixed cost what is the maximum profit for the producer? A producer in a perfectly competitive industry has a cost function described by TC(q)=1000+6q+0.2q^2. If the market price is 40 and it has already committed to paying the fixed cost what is the maximum profit for the producer? A producer in a perfectly competitive industry has a cost function described by TC(q)=1000+6q+0.2q^2. If the market price is 40 and it has already committed to paying the fixed cost what is the maximum profit for the producer? A producer in a perfectly competitive industry has a cost function described by TC(q)=1000+6q+0.2q^2. If the market price is 40 and it has already committed to paying the fixed cost what is the maximum profit for the producer? A producer in a perfectly competitive industry has a cost function described by TC(q)=1000+6q+0.2q^2. If the market price is 40 and it has already committed to paying the fixed cost what is the maximum profit for the producer? A producer in a perfectly competitive industry has a cost function described by TC(q)=1000+6q+0.2q^2. If the market price is 40 and it has already committed to paying the fixed cost what is the maximum profit for the producer? A producer in a perfectly competitive industry has a cost function described by TC(q)=1000+6q+0.2q^2. If the market price is 40 and it has already committed to paying the fixed cost what is the maximum profit for the producer? A producer in a perfectly competitive industry has a cost function described by TC(q)=1000+6q+0.2q^2. If the market price is 40 and it has already committed to paying the fixed cost what is the maximum profit for the producer? Show less