{ "key_pair_value_system": true, "answer_rating_count": "", "question_feedback_html": { "html_star": "", "html_star_feedback": "" }, "answer_average_rating_value": "", "answer_date_js": "2024-09-12T00:04:44-04:00", "answer_date": "2024-09-12 00:04:44", "is_docs_available": "", "is_excel_available": "", "is_pdf_available": "", "count_file_available": 0, "main_page": "student_question_view", "question_id": "10325878", "url": "\/study-help\/questions\/from-the-blackscholesmerton-model-nd1-042-for-a-3month-10325878", "question_creation_date_js": "2024-09-12T00:04:44-04:00", "question_creation_date": "Sep 12, 2024 12:04 AM", "meta_title": "[Solved] From the Black-Scholes-Merton model, N(d1 | SolutionInn", "meta_description": "Answer of - From the Black-Scholes-Merton model, N(d1) = 0.42 for a 3-month call option on Panorama Electronics common stock. If t | SolutionInn", "meta_keywords": "black-scholes-merton,model,n,d1,0.42,3-month,call,option,panorama,electronics,common,stock", "question_title_h1": "From the Black-Scholes-Merton model, N(d1) = 0.42 for a 3-month call option on Panorama Electronics common stock. If the stock price falls by $1.00, the", "question_title": "From the Black-Scholes-Merton model, N(d1) = 0.42 for a 3-month call option", "question_title_for_js_snippet": "From the Black Scholes Merton model, N(d1) 0 42 for a 3 month call option on Panorama Electronics common stock If the stock price falls by $1 00, the price of the call option will Decrease by less than the increase in the price of the put option Increase by more than the decrease in the price of the put option Decrease by the same amount as the increase in the price of the put option ", "question_description": "